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**The Cryosphere**
An interactive open-access journal of the European Geosciences Union

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- About
- Editorial board
- Articles
- Special issues
- Highlight articles
- Manuscript tracking
- Subscribe to alerts
- Peer review
- For authors
- For reviewers
- EGU publications
- Imprint
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- About
- Editorial board
- Articles
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- Manuscript tracking
- Subscribe to alerts
- Peer review
- For authors
- For reviewers
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- Abstract
- Introduction
- The cellular automata approach
- Results I: dynamics of fully developed snow barchans
- Results II: from transverse waves to barchans
- Summary and outlook
- Data availability
- Author contributions
- Competing interests
- Acknowledgements
- Financial support
- Review statement
- References
- Supplement

**Research article**
09 Dec 2019

**Research article** | 09 Dec 2019

Understanding snow bedform formation by adding sintering to a cellular automata model

^{1}School of Architecture, Civil and Environmental Engineering, Swiss Federal Institute of Technology, Lausanne, Switzerland^{2}WSL Institute for Snow and Avalanche Research SLF, Davos, Switzerland

^{1}School of Architecture, Civil and Environmental Engineering, Swiss Federal Institute of Technology, Lausanne, Switzerland^{2}WSL Institute for Snow and Avalanche Research SLF, Davos, Switzerland

**Correspondence**: Varun Sharma (varun.sharma@epfl.ch)

**Correspondence**: Varun Sharma (varun.sharma@epfl.ch)

Abstract

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Cellular-automata-based modelling for simulating snow bedforms and snow deposition is introduced in this study. The well-known ReSCAL model, previously used for sand bedforms, is adapted for this purpose by implementing a simple sintering mechanism. The effect of sintering is first explored for solitary barchan dunes of different sizes and flow conditions. Three types of behaviour are observed: small barchans continue their motion without any perceptible difference while large barchans sinter immediately. Barchans of intermediate size split, leaving behind a sintered core and a smaller barchan is formed. It is found that sintering introduces an upper limit to the size of bedforms that can remain mobile. The concept of “maximum streamwise length” (MSL) is introduced and MSL is identified for different wind speeds using the solitary dune scenario. Simulations of the full evolution from an initially flat snow layer to a complex dune field are performed next. It is found that the largest bedforms lie below the MSL threshold. Additionally, it is found that shallow snow layers are most susceptible to mechanical destabilization by the wind.

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How to cite.

Sharma, V., Braud, L., and Lehning, M.: Understanding snow bedform formation by adding sintering to a cellular automata model, The Cryosphere, 13, 3239–3260, https://doi.org/10.5194/tc-13-3239-2019, 2019.

1 Introduction

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Under the action of wind blowing over a layer of freshly deposited snow, snow reorganizes due to aeolian transport mechanisms into a number of shapes and bedforms; an initially flat surface may evolve into an undulated surface with significant height variations due to bedforms of various length scales. These bedforms and thus the surface continue to evolve until the wind speed falls below a threshold value. Thus upon snowfall, a snow grain lying on the surface may traverse a long and complex path before reaching its final resting place, or in other words until *ultimate deposition*.

Transport of snow by the wind and the formation of bedforms affects nearly all snowpacks, which by some estimates cover approximately 8 % of the earth's surface during the course of a year (Filhol and Sturm, 2015). Research in aeolian transport of snow can be broadly divided into two streams based on their direct interaction with human activities. One stream deals with implications of snow transport for hydrology, particularly with respect to preferential deposition of snowfall (Lehning et al., 2008; Gerber et al., 2018), sublimation of drifting and blowing snow (Déry and Yau, 2002; Sharma et al., 2018), avalanche prediction (Bartelt and Lehning, 2002; Schirmer et al., 2009), and road safety (Tabler, 2003). The other stream of research is focussed on polar regions where extensive snowpacks exist and are critical in modulating the energy and water budget of the Earth system (Vaughan et al., 2013). In almost all of such a vast array of topics, the implications of snow bedforms have not been taken into account even though the physics of aeolian transport of snow and the morphodynamics of snow-covered surfaces are intimately linked.

The importance of snow bedforms primarily stems from the fact that their presence results in an undulating surface which affects basic exchange parameters that dictate transfer of mass, energy and momentum between the surface and the atmosphere, namely the roughness lengths for specific humidity, sensible heat and velocity. Values of roughness lengths are fairly unconstrained at the moment and severely affect modelling for both atmospheric flows (Amory et al., 2015; Vignon et al., 2017, 2018) and hydrology (Groot Zwaaftink et al., 2011). Surface geometry and uncertainty in exchange processes across the snow–atmosphere boundary affect research topics as distinct as interpretation of ice cores and palaeoclimatology (Birnbaum et al., 2010), remote sensing of snow-covered areas (Warren et al., 1998; Leroux and Fily, 1998; Corbett and Su, 2015; Picard et al., 2014), and both the mechanical and thermal dynamics of sea-ice packs (Petrich et al., 2012; Castellani et al., 2014).

Unlike research in snow bedforms, the study of bedforms in sand has progressed much further and can be considered to be at a fairly advanced state. There exists a vast body of literature documenting field, wind tunnel and numerical experiments of aeolian transport of sand and formation of surface morphological features (see Kok et al., 2012, for a comprehensive review of these studies). Thus, almost all concepts of aeolian transport of granular material have been developed mostly in the context of the sand material. Fortunately, models as well as understanding developed in the sand context have been found to be readily applicable in the snow context (Nishimura and Hunt, 2000; Comola and Lehning, 2017; Clifton et al., 2006; Doorschot and Lehning, 2002). This is particularly true for *dry* and/or freshly fallen snow. This similarity extends to bedform features as well, with features such as waves, transverse dunes, barchans and longitudinal dunes, which are found in both sand and snow surfaces.

One framework of understanding aeolian transport of any granular material, sand or snow, is to analyse grain-scale interactions between the grains themselves as well as grains and the air. When the stress at the surface due to wind motion (*τ*_{s}) exceeds a threshold value, the grains at the surface are dislodged and entrained into the air. This process is known as *aerodynamic entrainment* (Bagnold, 1941; Anderson and Haff, 1991). Upon entrainment, a grain will follow a chaotic trajectory modulated by the turbulent air motions. Larger (and heavier) grains may fall back onto the surface with sufficient kinetic energy to dislodge additional grains into the air. This process is known as *splash entrainment* (Kok and Renno, 2009). Particles impacting the surface may additionally rebound to re-enter the air through what is denoted as *rebound entrainment* (Anderson and Haff, 1991). Parametrizations exist for each of the entrainment mechanisms and have been extended to sintered snow as well (Comola and Lehning, 2017; Schmidt, 1980).

At a larger scale however, grain-scale interactions alone are insufficient to explain the variation in fluxes of material as spatial heterogeneities of wind and surface-shear stress begin to play an important role (Charru et al., 2013). Often, this variation is caused by an undulating topography at different scales. At any given instant in time, different locations on the surface, even in close proximity, could be subjected to very different surface-shear stresses (Groot Zwaaftink et al., 2014). In this scenario, aeolian transport of snow and sand must be analysed in terms of regions dominated by net erosion or deposition. On the basis of conservation of mass, erosion and deposition is related to positive and negative horizontal gradients of mass fluxes respectively. This fact further implies that regions of erosion are formed at locations with increasing surface-shear stress in the horizontal direction $\left(\partial {\mathit{\tau}}_{\text{s}}/\partial x>\mathrm{0}\right)$, whereas regions of deposition are formed where the shear stress decreases $\left(\partial {\mathit{\tau}}_{\text{s}}/\partial x<\mathrm{0}\right)$. Thus, there is a direct feedback between aeolian transport resulting in formation of bedforms, which in turn perturb the near-surface wind field.

Study of snow bedforms is distinguished by two prominent features of snow. First, and seemingly trivial, is the fact that snow on the surface is replenished regularly (at least in the winter months in non-polar regions). This coupled with the fact that the timescales of snow transport are much shorter than those of sand (on account of the much lower density of snow compared to sand) means that snow bedforms are ephemeral structures that form rapidly and then get buried during fresh snowfall.

The second, and more critical aspect from the perspective of surface morphodynamics is the ability of snow grains to form ice bonds with each other in a process known as sintering. The process of sintering is quite complex and is dependent on the temperature, relative humidity and overlying pressure in the snowpack (Colbeck, 1997; Blackford, 2007; Gow and Ramseier, 1964). The effect of sintering on grain-scale aeolian processes is unknown at the moment. However some attempts to account for the effect of sintering in large-scale models have been reasonably successful. For example, regional-scale models used in Vionnet et al. (2014) Gallée et al. (2015), Amory et al. (2015) and Agosta et al. (2018) use an erodibility factor as a decreasing function of the age of snow. Thus at larger scales, the effect of sintering on aeolian transport can be considered in a straightforward manner; sintering prevents erosional activity leading to permanent deposition of snow.

It must be noted that moderately sintered snow bedforms can still be eroded by impacting snow grains during strong drifting and blowing snow conditions. This mechanism has been proposed to be the genesis of sastrugi (Leonard, 2009), which are thus classified as erosional bedform features. Sastrugi are one of the most common types of snow bedforms observed as opposed to snow dunes such as barchans, waves, etc. Their impact on near-surface wind flow is particularly pronounced as has been quantitatively described in recent studies focussed on Antarctica (Vignon et al., 2017; Amory et al., 2017, 2016), where it was found that flow perpendicular to the sastrugi field experiences drag 2 orders of magnitude higher.

Computational modelling has played a central role in improving the understanding of aeolian transport processes both at the grain scale and for developing parametrizations for mechanisms at different scales in the context of both sand and snow transport. At the smallest relevant scale of grain-scale interactions, discrete element modelling (DEM) has allowed for linking material properties to transport mechanisms following the pioneering work of Anderson and Haff (1988). Studies using this technique have been particularly useful in understanding the saltation process (Carneiro et al., 2013, 2011; Pähtz et al., 2015). At a larger scale, particularly where (turbulent) air–grain interactions also need to be accounted for, the DEM technique or the grain-scale parametrizations described earlier are coupled with Reynolds-averaged Navier–Stokes (RANS) fluid solvers where the full spectrum of turbulence is parametrized (Durán et al., 2014; Nemoto and Nishimura, 2004). In this regard, the recent use of the large-eddy simulation (LES) technique to simulate turbulent flows is particularly promising (Sharma et al., 2018; Groot Zwaaftink et al., 2014; Dai and Huang, 2014).

From the perspective of resolving dynamics at the bedform-scale however, the above techniques are too computationally intensive. At this scale, there are two main modelling approaches. In one approach, the surface is treated as a continuum and balance equations are derived for height at a point on the surface as a function of divergence of mass flux. (Anderson, 1987; Sauermann et al., 2001; Kroy et al., 2002). The movement of mass through air is treated in an Eulerian fashion.

The alternative technique is to use models based on cellular automata (CA) to simulate bedform dynamics. This technique is dramatically different from all previously stated methods that are essentially directly related to Newton's laws of mechanics and conservation. CA-based models are purely of a phenomenological nature where mechanisms of erosion, transport and deposition are directly implemented in the form of *transitions* of state of cells containing the material of interest. Rules of transition for a cell are linked only to the state of the neighbouring cells and can be represented as time-dependent stochastic processes. These models are extremely attractive for their ability to seemingly reproduce features in complex systems in a quantitative and robust manner while being computationally parsimonious. The disadvantage is that due to a lack of firm footing in mechanics, the algorithms are not constrained and a lot of trial and error is involved in identifying relevant transition rules.

The genesis of CA-type models is rooted in tenets of statistical mechanics, dynamical systems and chaos theory (Wolfram, 1984). Their application to bedform dynamics was pioneered by Werner (1995), who validated this approach by simulating formation and dynamics of various different dune shapes. CA models have been consistently improving over the past 2 decades with various works progressively updating the algorithms (i.e, the transition rules) to approach better known and established physical laws. Notable examples include Nishimori et al. (1998), Bishop et al. (2002), Kocurek and Ewing (2005), and Katsuki et al. (2005).

Narteau et al. (2009) introduced a new CA-based model named ReSCAL that overcame a major shortcoming of the earlier CA-based models by coupling the CA model of the granular material to a CA model for the air. This allowed, for the first time, the simulation of the complete feedback between the evolving surface, the resultant perturbations in the flow and its impact on aeolian transport. Narteau et al. (2009) additionally provided a way of converting results of the CA-generated surface features into physically meaningful quantities that could be directly related to field data.

In this study we introduce CA-based modelling for snow bedforms and snow deposition. Our work in this context is directly motivated by recent measurements of snow bedforms (specifically barchans) made by our group in East Antarctica (Sommer et al., 2018). We adopt the ReSCAL model as well as the methodology presented by Narteau et al. (2009) and further clarified by Zhang et al. (2012). We then implement a simple sintering mechanism with the ReSCAL model following the concepts described by Filhol and Sturm (2015). Description of the modelling framework is provided in Sect. 2. Upon establishing proper length and timescales for snow transport, we first simulate and describe the effects of sintering on solitary barchans in Sect. 3. Next, the full transition from an initially flat snow surface to a complex dune field and the effect of sintering on such a system is described in Sect. 4. Finally, in Sect. 5, the study is summarized along with an outlook for the role this methodology could play in the future.

2 The cellular automata approach

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In this section we describe the cellular automata approach used in this study. Modelling the interaction between the wind, the snow-covered surface and the mobilized snow present in the air is achieved by running two cellular-automata-type models in conjunction. One model is focussed on modelling the motion of the snow grains, whereas the other focusses on the wind. As noted in Sect. 1, we have adopted the open-source version of the ReSCAL software that consists of implementation of both the models and their coupling. The ReSCAL model is described in detail in Narteau et al. (2009) and its application for sand dunes is presented in Zhang et al. (2010, 2014). In fact, Rozier and Narteau (2014) further extended the CA approach for multidisciplinary studies of landscape dynamics. Since the model has already been discussed in multiple aforementioned publications, we provide only a brief synopsis of the method for the sake of completeness. The effects of cohesion modelled through a simple sintering mechanism are the novelty of this work, and thus its implementation and results are focussed upon in this article.

Cellular automata modelling of snow transport consists of first discretizing the three-dimensional space to be simulated into cells that can only have one of three possible states: air, deposited snow (DS) or mobile snow. At the beginning of the simulation for example, one would typically consider a snow-covered surface with no mobile snow cells. Each of these cells in this study has dimensions of *l*_{0} in the horizontal direction and *h*_{0} in the vertical direction. The ratio of the horizontal and vertical length scales is a model parameter and in our case, ${l}_{\mathrm{0}}/{h}_{\mathrm{0}}=\mathrm{5}$. This allows for greater vertical resolution in the model and is required for simulating snow bedforms that are typically much flatter and shallower than sand bedforms (Filhol and Sturm, 2015). Note that this ratio is a free parameter in the model and was chosen as such to have a balance between increased computational expense (due to increased number of cells in the vertical) versus better resolution of the snow surface. In any case, test simulations performed with even higher vertical resolution (not shown) did not modify the results much.

The model proceeds in the form of transitions of the cell states based on certain rules. In the ReSCAL model, these rules are based on nearest-neighbour cell pairings known as doublets. A list of phenomenologically important doublet combinations is made a priori. Each of these doublet combinations can transition to a different doublet combination. These doublet groupings are presented in Fig. 1a, where they are grouped into six different phenomenological mechanisms, namely deposition, erosion, transport, gravity, diffusion and avalanching. Before we elaborate further, it would be beneficial to avoid connecting the above-listed mechanisms directly to physical processes with the same names to avoid confusion. For example, erosion in the CA model is not directly linked to the different grain-scale entrainment mechanisms discussed in Sect. 1 even though at bulk scale, it is intended to produce the same effect.

Each of the transitions (from doublet a to doublet b) described in Fig. 1a is associated with a transition-rate parameter, Λ, with subscripts used to distinguish transition rates of different mechanisms. These transition rates have a dimension of inverse time or frequency. This allows for a timescale to be introduced into the CA model (the length scale being introduced by the discretization of the space). The simulation progresses in a time-dependent stochastic fashion with each transition being regarded as a Poisson process. At each time step, all the doublets eligible for transition are counted and a total transition rate of the system is computed, which is simply a total of all the transition rates weighted by the number of doublets eligible for each transition (note that computing a global transition rate is possible for Poisson processes using the additive property). The global transition of the system is also a Poisson process, and thus the time step can be stochastically chosen. The transition to be performed is chosen next based on the conditional probability of each transition. Finally, one of the doublets eligible for the chosen transition type is randomly picked and a transition is performed. In summary, at each instance of the simulation, the transition type to be performed, the doublet to be transitioned as well as the value of the time step itself are stochastically chosen based on the value of the transition rates and the global state of the cells. A list of transition rates for the CA model used throughout this study is given in Table 1.

It is clear, therefore, that only the relative values of the transition rates are important. These rates are chosen to roughly reflect observations in reality. For example, at bulk scale, transport is far more rapid than erosion or deposition. Erosion itself is typically faster but a more local process compared to deposition, which is slower but occurs over larger length scales (consider a scenario of deposition of effluents from a plume). The processes of gravity and cross-stream diffusion (due to turbulence) are the fastest and slowest respectively. Avalanching is implemented in an extremely simple manner following Bak et al. (1988) – if the local slope is larger than a critical angle, a cell at that location is moved to a random location down the slope. We realized a posteriori that for the scale of the dunes simulated in this study, avalanching is of negligible importance, and thus it is not discussed further.

The flow overlying the evolving surface is simulated using the lattice-gas cellular automata (LGCA) approach. In this numerical technique, the fluid is modelled as a set of particles lying on the nodes of a square (or cubical) mesh that is called a *lattice*. A particle must lie on one of the nodes of the lattice at all times and each node of the lattice can hold only one particle at any given time. Furthermore, a particle can move only to the nearest or next-nearest neighbours in one time step of the simulation. In other words, the velocities that a particle may have are extremely limited, in both magnitude and direction. This is illustrated in Fig. 1b. The top panel in this figure shows for example, that a particle may move only to nearest or next-nearest lattice points. Thus, a particle may move in one of eight different directions and have two possible speeds. A time step in the LGCA consists of two sub-steps. The first is known as the *propagation* step, shown in the lower left panel, where all particles with non-zero velocities move to their destination lattice nodes. The incoming particles at each node are represented by the green arrows that all lead into lattice points. Note that different lattice points have different numbers of incoming particles. After this sub-step, it may happen that multiple particles (temporarily) lie on the same node. To impose the constraint that a node may have only one particle, N-body collision calculations are performed between the incoming particles, and the particles obtain new velocities. These new velocities are represented by outgoing green arrows from many lattice points in the lower-right panel of Fig. 1b. This step is known as the collision step. The lattice velocities as well as the N-body collision rules are adopted from D’Humières et al. (1986). As boundary conditions for the fluid particles, the collision of a particle with a solid object or a wall is modelled as a simple elastic collision (similar to the model of the ideal gas). The LGCA methodology further provides a simple way to convert lattice-based velocities to “real” velocity of the flow. Typically it is simply the average of the velocities of particles in a given neighbourhood.

The LGCA approach is in some sense a reduced-order model of the full Navier–Stokes equations achieved by imposing strict constraints on directions and velocity values. Its development began with the pioneering work of Frisch et al. (1986) and was the precursor to more advanced lattice–Boltzmann methods. The LGCA model in ReSCAL is adopted from D’Humières et al. (1986). This modelling technique has the advantage that it is an extremely rapid method to simulate flow over complex surfaces, which is typically quite challenging for more traditional fluid simulation techniques such as large-eddy simulations or even Reynolds'-averaged Navier–Stokes (RANS) models. In the context of its use in this study, the LGCA, by simulating flow over complex bedforms on the surface, provides values of the surface-shear stress at every location of the surface. The surface-shear stress is essentially computed as a gradient of the velocity (computed using LGCA) in the direction normal to the local surface. The surface (as well as the normal) is of course the result of the CA model for snow transport.

Of all the transition types, erosion is the only one directly linked to the morphology of the surface while all other transitions are independent of their location in 3-D space. This link between erosion and morphology is established by modifying the transition rate for erosion according to location and making it a function of surface-shear stress, which due to surface morphology is heterogeneous. Thus, areas in the domain with larger shear stress experience more erosion. In the ReSCAL model, the erosion rate is linearly dependent on excess shear stress (*τ*_{s}−*τ*_{1}) as

$$\begin{array}{}\text{(1)}& {\displaystyle}{\mathrm{\Lambda}}_{\mathrm{e}}={\mathrm{\Lambda}}_{\mathrm{0}}{\displaystyle \frac{{\mathit{\tau}}_{\mathrm{s}}-{\mathit{\tau}}_{\mathrm{1}}}{{\mathit{\tau}}_{\mathrm{2}}-{\mathit{\tau}}_{\mathrm{1}}}}\phantom{\rule{0.25em}{0ex}}\mathrm{for}\phantom{\rule{0.25em}{0ex}}{\mathit{\tau}}_{\mathrm{1}}\le {\mathit{\tau}}_{\mathrm{s}}\le {\mathit{\tau}}_{\mathrm{2}},\end{array}$$

where *τ*_{s} is the local surface-shear stress and *τ*_{1} and *τ*_{2} are the lower and upper limits of the linear regime. For *τ*_{s}<*τ*_{1}, the erosion rate is set to zero while for *τ*_{s}>*τ*_{2}, the erosion rate is at the maximum possible value of Λ_{0}. The values of Λ_{0} and *τ*_{2}−*τ*_{1} are constant and act only as scale and slope parameters respectively. *τ*_{1} is equivalent to a threshold shear stress and is kept as a free parameter. As is explained in Sect. 2.4, it is used to specify the wind speed. A subtle point to note is that the shear stress quantities are scaled with respect to the shear stress scale, *τ*_{0}. This scale is not discussed or identified in this study as it is not directly relevant to finding the kinematic scales of length and time.

^{a} Ratio of vertical to horizontal rates for both erosion and transport mechanisms. ^{b} Enhancement factor for deposition due to DS-type cells.

It is through the erosion mechanism that the flow simulation performed using LGCA and the snow transport performed using CA are tightly coupled (see Fig. 1c). This robust coupling between the flow, its modification due to the undulating surface and the evolution of the surface itself is the defining feature of the ReSCAL model and thus makes it perhaps one of the best cellular automata models for simulating surface morphology that exists. This can be evidenced from the successful application of the ReSCAL model to simulate various complex sand bedforms on Earth (Zhang et al., 2010; Ping et al., 2014; Lü et al., 2017) and Mars (Zhang et al., 2012) and also gives us the confidence of introducing this model to the cryospheric science community.

In this study, we intend to focus on the effect of sintering on snow bedform dynamics. For this purpose we implement a simple sintering mechanism that suits the CA modelling approach. Every time a cell transitions to the “deposited snow” (DS) type, the time step of the simulation is noted. This provides a way of measuring the age of the snow cell, i.e, the period of time a snow parcel rests in one place. All transition rates for transitions consisting of DS-type cells are then multiplied by an *erodibility factor*, *f*_{E}, which is simply chosen to be a linearly decreasing function of the age of the cell with the most important transition being erosion. Thus, Eq. (1) describing the erosion mechanism is modified as

$$\begin{array}{}\text{(2)}& {\displaystyle}{\mathrm{\Lambda}}_{\mathrm{e}}={\mathrm{\Lambda}}_{\mathrm{0}}\phantom{\rule{0.125em}{0ex}}{f}_{\mathrm{E}}\phantom{\rule{0.125em}{0ex}}{\displaystyle \frac{{\mathit{\tau}}_{\mathrm{s}}-{\mathit{\tau}}_{\mathrm{1}}}{{\mathit{\tau}}_{\mathrm{2}}-{\mathit{\tau}}_{\mathrm{1}}}}\phantom{\rule{0.25em}{0ex}}\mathrm{for}\phantom{\rule{0.25em}{0ex}}{\mathit{\tau}}_{\mathrm{1}}\le {\mathit{\tau}}_{\mathrm{s}}\le {\mathit{\tau}}_{\mathrm{2}},\end{array}$$

with the erodibility factor *f*_{E} being defined as

$$\begin{array}{}\text{(3)}& {f}_{\mathrm{E}}\left(t\right)=\left\{\begin{array}{ll}\left(\mathrm{1}-\frac{t-{t}_{\mathrm{dep}}}{{t}_{\mathrm{s}}}\right)& \text{for}\phantom{\rule{0.25em}{0ex}}t-{t}_{\mathrm{dep}}\le {t}_{\mathrm{s}}\\ \mathrm{0}& \text{for}\phantom{\rule{0.25em}{0ex}}t-{t}_{\mathrm{dep}}\ge {t}_{\mathrm{s}}\end{array}\right.,\end{array}$$

where *t* is the current time of the simulation, *t*_{dep} is the time when the cell transitioned to a DS-type cell and *t*_{s} is the sintering timescale, i.e, the time after which a DS-type cell cannot perform any further transitions. This is a new parameter that must be chosen for such a model and we have chosen it to be 24 h. Thus, after 24 h, a DS-type cell will permanently remain in the same location for the rest of the simulation.

Cells that remain erodible, i.e., have ages less than 24 h are henceforth denoted as eDS-type cells while immobilized; sintered cells with ages greater than 24 h are denoted as neDS-type cells. This model is directly inspired by the approach of Filhol and Sturm (2015) and circumvents the requirement of accurate modelling of the highly complex and poorly understood phenomenon of sintering. The erodibility factor, *f*_{E}, of snow cells as a function of their age, *t*−*t*_{dep}, is shown in Fig. 1d. The coloured boxes in Fig. 1d are shown only to visually represent transition of eDS-type cells, coloured light blue, to neDS-type cells, which are coloured dark blue. A similar colour scheme is adopted in the following sections. Note that in the context of this study, erosion and erodibility refer only to the action of the wind. Erosion due to the impact of airborne snow grains on a moderately sintered snow bedform is not simulated and is kept for future work.

A crucial contribution of Narteau et al. (2009), in addition to the development of the ReSCAL model, was the development of a methodology of translating results of CA models, in which length (*l*_{0}) and timescales (*t*_{0}) are unknown, to real units, thus allowing for intercomparison between simulations and data collected from field experiments. We present their approach and the related calculations of length and timescales used in this study below.

Consider a system consisting of air blowing over a flat granular bed. If the flow velocity is faster than a threshold velocity, the system is mechanically unstable, resulting in aeolian transport and leading to the formation of the bedforms. For a *small* period of time after aeolian transport commences, the system can be analysed using linear stability analysis, which identifies the fastest growing mode of the evolving surface. Past theoretical analyses (Hersen et al., 2002; Elbelrhiti et al., 2005; Claudin and Andreotti, 2006) have established this length scale, *λ*_{max}, as being
equal to 50 ${\mathit{\rho}}_{\mathrm{s}}\stackrel{\mathrm{\u203e}}{d}/{\mathit{\rho}}_{\mathrm{f}}$, where *ρ*_{s} is the density of the grains, *ρ*_{f} is the density of the overlying fluid (air in our case) and $\stackrel{\mathrm{\u203e}}{d}$ is the mean grain size diameter.

We performed a series of numerical experiments using the ReSCAL model where we simulate flow over a wavy surface with a different wavelength for each experiment and with an amplitude (*A*) of 2 *h*_{0}, which is the smallest amplitude we can have in our discrete system. We allow the simulation to proceed for a very short time and measure the growth of the natural logarithm of amplitude with time (dln (*A*)∕d*t*). The results of these numerical experiments are shown in Fig. 2a. It can be clearly seen that the fastest-growing wavelength is *λ*=28*l*_{0}. Thus,

$$\begin{array}{}\text{(4)}& {\displaystyle}{\mathit{\lambda}}_{\mathrm{max}}=\mathrm{28}{l}_{\mathrm{0}}=\mathrm{50}{\displaystyle \frac{{\mathit{\rho}}_{\mathrm{s}}}{{\mathit{\rho}}_{\mathrm{f}}}}\stackrel{\mathrm{\u203e}}{d}.\end{array}$$

Using values of *ρ*_{f}=1.00 kg m^{−3}, *ρ*_{s}=910 kg m^{−3} and $\stackrel{\mathrm{\u203e}}{d}=\mathrm{200}$ µm, we find the length scale of our model to be *l*_{0}=0.325 m.

Once the length scale has been identified, we can now proceed to identify the timescale of the system. Returning to the system of air being blown over a flat surface, it has already been established that a *long* time after the initiation of the aeolian transport and with the wind speed being constant, the flux of grains in the air achieves a steady-state value known as the saturated flux *Q*_{sat}. Past work, beginning already with Bagnold (1941) and refined over successive studies using both field and wind tunnel data, has resulted in a semi-empirical formulation of *Q*_{sat} as a function of material and flow properties (Bagnold, 1936; Iversen and Rasmussen, 1999; Ungar and Haff, 1987). In effect, the saturated flux can be computed as

$$\begin{array}{}\text{(5a)}& {\displaystyle}{Q}_{\mathrm{sat}}=\mathrm{25}\sqrt{{\displaystyle \frac{\stackrel{\mathrm{\u203e}}{d}}{g}}}\left({\displaystyle \frac{{\mathit{\rho}}_{\mathrm{f}}}{{\mathit{\rho}}_{\mathrm{s}}}}\right)\left({u}_{*}^{\mathrm{2}}-{u}_{\mathrm{c}}^{\mathrm{2}}\right),\end{array}$$

with

$$\begin{array}{}\text{(5b)}& {\displaystyle}{u}_{\mathrm{c}}=\mathrm{0.1}\sqrt{{\displaystyle \frac{{\mathit{\rho}}_{\mathrm{s}}g\stackrel{\mathrm{\u203e}}{d}}{{\mathit{\rho}}_{\mathrm{f}}}}},\end{array}$$

where *u*_{*} and *u*_{c} are the friction velocity and the threshold friction velocity for aeolian transport respectively.

If we consider an idealized scenario where the threshold velocity is zero with the resultant saturated flux value being ${Q}_{\mathrm{sat}}^{\mathrm{0}}$, a relationship relating saturated fluxes only as a function of *u*_{*} and *u*_{c} can be found as

$$\begin{array}{}\text{(6)}& {\displaystyle}{Q}_{\mathrm{sat}}^{\mathrm{ratio}}={\displaystyle \frac{{Q}_{\mathrm{sat}}}{{Q}_{\mathrm{sat}}^{\mathrm{0}}}}=\mathrm{1}-{\displaystyle \frac{{u}_{\mathrm{c}}^{\mathrm{2}}}{{u}_{*}^{\mathrm{2}}}}\phantom{\rule{0.125em}{0ex}}.\end{array}$$

This relationship is quite useful for CA-based modelling as the free parameter of *τ*_{1} is essentially equivalent to ${u}_{\mathrm{c}}^{\mathrm{2}}$ and for modelling purposes can be chosen to be equal to zero. Thus, for different values of *τ*_{1}, the CA model provides the left-hand side (LHS) of Eq. (6). We performed a series of experiments beginning with the idealized scenario of setting *τ*_{1}=0 and gradually increasing the value of *τ*_{1} for each individual experiment. In each experiment we allowed the system to reach steady state and calculated the steady-state flux of snow in the air. The resulting values of ${Q}_{\mathrm{sat}}^{\mathrm{ratio}}$ as a function of *τ*_{1} are shown in Fig. 2b. Once ${Q}_{\mathrm{sat}}^{\mathrm{ratio}}$ ratios for different values of *τ*_{1} are found, we can compute the *u*_{*} in real units for a given value of *τ*_{1}. Note that *u*_{c} is computed using Eq. (5b). Using the log law, a given *u*_{*} value can be converted to wind speed above a chosen height over the surface. Using a roughness length of ${z}_{\mathrm{0}}={\mathrm{10}}^{-\mathrm{4}}$ m, wind speed at a height of 1 m above the surface, denoted as *U*_{1 m}, is computed and shown in Fig. 2c. Once the *u*_{*} value for each *τ*_{1} is found, we can compute the real saturated flux using Eq. (5a) and equate it to the model saturated flux. Thus ${Q}_{\mathrm{sat}}^{\mathrm{model}}\phantom{\rule{0.125em}{0ex}}{l}_{\mathrm{0}}{h}_{\mathrm{0}}/{t}_{\mathrm{0}}={Q}_{\mathrm{sat}}^{\mathrm{real}}$ m^{−2} s^{−1}. As the length scales *l*_{0} and *h*_{0} are known, *t*_{0} can be found as a function of *τ*_{1}. Values of the timescale *t*_{0} for different values of *τ*_{1} are shown in Fig. 2d. Note that the stress scale, *τ*_{0}, is not identified explicitly due to the fact that in addition to length and timescales, it would require a mass scale as well. Furthermore, since it is important only in terms of ratios and is directly related to the wind speed, it is not of major importance to the current study.

Having established the length and timescales of the CA model, we choose three particular values of *τ*_{1} that are typically used in this study. These are ${\mathit{\tau}}_{\mathrm{1}}\in \left\{\mathrm{5},\mathrm{20},\mathrm{60}\right\}$ and are equivalent to ${U}_{\mathrm{1}\phantom{\rule{0.125em}{0ex}}\mathrm{m}}\in \left\{\mathrm{20.5},\mathrm{12.5},\mathrm{7.0}\right\}$ m s^{−1} and denoted further as high-wind (UH), medium-wind (UM) and low-wind (UL) cases respectively. Values of different quantities involved in calculating the timescales for these three *τ*_{1} values are provided in Table 2 with the full dataset of computed values for all the values of *τ*_{1} provided in Table S1 in the Supplement.

^{a} Computed using $\frac{{Q}_{\mathrm{sat}}\left({\mathit{\tau}}_{\mathrm{1}}\right)}{{Q}_{\mathrm{sat}}^{\mathrm{0}}}$, where ${Q}_{\mathrm{sat}}^{\mathrm{0}}=\mathrm{2.273}\times {\mathrm{10}}^{-\mathrm{2}}\phantom{\rule{0.125em}{0ex}}{l}_{\mathrm{0}}{h}_{\mathrm{0}}/{t}_{\mathrm{0}}$. ^{b} Using Eq. (6), where *u*_{c}=0.134 m s^{−1}, using Eq. (5b). ^{c} Through the log law, $u=\frac{{u}_{*}}{\mathit{\kappa}}\phantom{\rule{0.125em}{0ex}}log\left(\frac{z}{{z}_{\mathrm{0}}}\right)$, where *κ* is the von Kármán constant (=0.4) and *z*_{0} is the roughness length $(={\mathrm{10}}^{-\mathrm{4}})$. ^{d} Computed using Eq. (5a) using material properties as described in the text. ^{e} By equating model and real saturated flux.

3 Results I: dynamics of fully developed snow barchans

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In the first set of results we consider the motion of a solitary barchan dune and the effect of sintering on its motion and morphology. All simulations in this section follow a common setup. The initial condition consists of a conical pile of unsintered snow with a given height and diameter of the base. The wind speed is equal to zero and thus there is no transport initially. We then choose one of the three different wind speeds as noted in Table 2 and first begin with only the LGCA model that accelerates the flow to eventually reach a statistically steady state. The snow cells are held in place during this spin-up phase. Once the flow is in equilibrium with the imposed initial snow bedform, the CA model is activated and the motion of snow cells is allowed to proceed. Note that the wind speeds described in the table and in text always refer to *mean* or large-scale wind speeds at the height of 1 m above the surface. The effect of sintering is activated only once the dune is in steady-state motion. The lateral boundary conditions are periodic for both the flow and the particles, with the particles' cross-stream location chosen randomly. Simulations are denoted as C_{α}, where *α* represents the height of the initial cone pile in *h*_{0} units. Relevant quantities for specific dune simulations are presented below while details for all the dunes simulated are presented in Table S2.

Before discussing the results of these simulations, it is pertinent to place their purpose in the proper context. It is of course improbable that in reality a conical pile of fresh snow would be found that is further moulded by the wind into barchans. The genesis of barchans, either in snow or even in sand, is not well-understood at the moment. The cone-pile experiments allow for creating realistic barchans without having to describe their genesis. Additionally, the size of cone provides some guidance as to the dimensions of the barchan ultimately formed and thus allows for creation of barchans with a range of dimensions. Secondly, the effect of sintering in reality would begin as soon as snow is deposited on the surface, most likely through snowfall. By activating the effect of sintering on barchans in steady motion, we intend to isolate the interplay between the inertia of a barchan (which is a function of barchan size and wind speed) and the effect of sintering, which essentially acts as a damper for dune movement.

Under the influence of constantly blowing wind, a conical pile morphs into a barchan dune that starts to move downstream. In Fig. 3a, we show the top and side views of the evolution of the conical pile (case C20, with a constant wind speed of *U*_{1 m}=20.5 m s^{−1}), into a barchan dune. Note that the time is scaled using the sintering timescale (*t*_{s}) of 24 h even though the sintering mechanism itself is switched off. The cone essentially flattens and elongates in both the streamwise (along-wind) and crosswind directions, thus increasing the length and the width of the snow deposit. This evolution can be quantitatively seen in Fig. 3b. The quantities of length (L) and width (W) are shown on the left axis, whereas the height (H) of the cone is shown on the right axis. The length and width of the dune is initially the same as the diameter of the cone, in this case, approximately 15 m, while the height of the cone is initially 1.1 m. After approximately 3 *t*_{s}, the morphology of the barchan, particularly its height, is approximately constant, and thus we consider that steady state has been achieved. At steady state, the L, W and H dimensions of the C20 dune are respectively 26.4 m, 22.75 m and 0.59 m.

We additionally also show the evolution of the length of the longest streamwise section of the barchan. This quantity is termed as the maximum streamwise length or MSL of the bedform (L_{s}). It has been shown that this is the slowest moving part of a barchan and thus is representative of the speed of the dune (Zhang et al., 2014). At steady state, we find L_{s} to be equal to 12.18 m. The relevance of L_{s} will be more apparent in the coming paragraphs. It is interesting to note that it takes approximately 3 *t*_{s} or 72 h for this dune to reach steady state. This is quite a long time considering that we have the wind blowing constantly for this period at *U*_{1 m}=20.5 m s^{−1}. Thus morphodynamics of the barchans are much slower than typical sintering timescales. This point is elaborated upon further in the rest of the paper.

In Fig. 3c, we show four different measures of the *speed* of the dune. In the field, one would typically track the location of the crest of the dune as a function of time. Other measures are also possible, such as tracking the displacement of the horn or the tail of the dune. Locations of the crest, tail and the horn of the barchan are tracked and plotted as a function of time. We find that all the speed measures are quite noisy, with the horn-based measure being most noisy and thus one to be avoided. To find the speeds, we thus resort to finding the slope of the best-fit line, values of which are provided in the legend of Fig. 3c. The horn-based speed measure is found to be the fastest, whereas the crest-based measure is found to be the lowest. Admittedly, the differences are minor, especially compared to the fluctuations itself. We use an additional measure based on tracking the centre of mass (COM) of the dune. In the field, this measure may be obtained by assuming constant snowpack density and a laser scanner. This measure may be preferred as a more physically based and unbiased measure of dune movement and thus in the rest of this study dune speed is meant to be the speed of the COM of a dune.

An example of the cone-based experiments presented in the previous paragraphs and shown in Fig. 3 is repeated for 16 different cone (and thus barchan) sizes and two additional wind speeds, namely the medium-wind UM (*U*_{1 m}=12.5 m s^{−1}) and low-wind UL(*U*_{1 m}=7.0 m s^{−1}) scenarios. In Fig. 4a, we show the variation in dune speed with dune length for four different dunes for the UH wind scenario. We show both the instantaneous dune speed (computed every 50 *t*_{0} steps, represented by circular symbols) and the time-averaged velocity trends. This is to contrast the large instantaneous dune speed fluctuations with a comparatively constrained time-averaged value of dune speed. As expected, dune speed decreases with the length (and thus size) of the dune. In Fig. 4b we show the variation in the dune speed of the same dune for the three different wind scenarios. Similar to the previous figure, there are large fluctuations of dune speed while the time-averaged value is more constrained. While differences between UH and UM cases are not significantly different, the dune in the UL case is almost 20 % slower than that in the UH and the UM cases. It must be noted that the effect of wind speed is not as significant as the dune size. Increasing the wind speed by a factor of 3 between the UL and the UH cases does not seem to induce a proportional response from the dune speed.

Thus, we have shown that the dune speed is inversely proportional to its height and directly proportional to wind speed. This is in fact a well-known property of barchans first recognized by Bagnold (1941) and quantitatively explored using field data by Elbelrhiti et al. (2005) for sand and by Kobayashi and Ishida (1979) for snow and in CA-type numerical experiments by Zhang et al. (2014). All these studies roughly proposed that

$$\begin{array}{}\text{(7)}& {\displaystyle}{c}^{*}={\displaystyle \frac{c}{Q}}=f\left(\mathrm{1}/H\right)\phantom{\rule{0.25em}{0ex}},\end{array}$$

where *c* is the dune speed, *Q* is the saturated snow flux, *c*^{*} is the normalized dune speed, *H* is the height of the dune and *f* is a linear function. We explore this scaling for snow barchans in Fig. 5.

Long time averaging of both the height and velocity of the dune in each of the 48 simulations is carried out and the velocity-versus-height data points for all these simulations are shown in Fig. 5a. Simulations are classified based on wind speed alone and coloured accordingly. Note that velocity is normalized by the flux of snow in each simulation. We find that all the simulation results, for different barchan dimensions as well as wind speeds, lie on a hyperbolic function of H. The least-squares fit is found to be

$$\begin{array}{}\text{(8)}& {\displaystyle}{c}^{*}={\displaystyle \frac{c}{Q}}={\displaystyle \frac{a}{H+b}}+d\phantom{\rule{0.25em}{0ex}},\end{array}$$

where *a*, *b* and *d* are parameters with values of 1.7 (dimensionless), −0.1 m and 0.94 m^{−1} respectively. In the same figure, we also show the instantaneous values of normalized velocity as a function of height for each of the simulations. To further quantify the fluctuations in instantaneous velocity, we show histograms of this quantity for four different barchans for *U*_{1 m}=20.5 m s^{−1} in Fig. 5b. We find that dune speeds become more constrained with increasing dune size with the smallest (largest) dune having the most (least) broad histogram.

We needed to perform time averaging for at least 18 h of instantaneous velocities to converge the time-averaged dune speed with the smallest dunes requiring up to 36 h of averaging. While this is fairly simple to do in an idealized environment of numerical computations, it is highly unlikely that such time averaging will be possible in the field, primarily due to fluctuations of mean wind speeds, effects of topography and the fact that the sintering process has similar timescales. On the other hand, due to large fluctuations of instantaneous velocity, a limited time series, even of a few hours, is unlikely to show any systematic trend. A possible solution could be to sample multiple mobile dunes, hopefully of different sizes, at the same time using a laser scanner or photogrammetry.

We would like to note that values of time-averaged dune speeds found using the CA model are fairly similar to those reported in (a few) published studies (see for example, Table 2 in Filhol and Sturm, 2015). The values for the UH and the UM cases in particular are close to the studies by Doumani (1967), Kuznetsov (1960) and Kotlyakov (1961). It must be noted that these studies are quite old, and in future work we shall further compare our results with the latest dataset from Kochanski (2018) and Kochanski et al. (2018). Dune dimensions and speeds for all 48 simulations performed are provided for reference in Table S2.

We now turn our attention to understanding the effect of sintering on dune morphodynamics. In this section, we focus on the effect of sintering on barchans that are already in steady motion. This is achieved by “switching on” the effect of sintering only once the morphology and the mean dune speed has reached a steady state.

Sintering is activated in all 48 simulations with different barchan shapes and wind speeds. In general, three types of behaviours are observed. Firstly, the fastest-moving barchans continue their motion without much difference. On the other hand, the slowest-moving barchans seem to sinter “in place”; i.e, the barchan immediately ceases to move, without any significant change in morphology. The intermediate behaviour is found for a range of dune speeds in between the extreme cases where a small part of the dune is deposited as a non-erodible layer while the dune continues to move, albeit with slightly reduced dimensions on account of loss of mass due to sintering.

To illustrate these three different types of behaviours, we show in Fig. 6 the morphodynamics of the same barchan dune (C20: L, W, H, L_{s}=26.4, 22.75, 0.59 and 12.3 m) for the UM and UL cases. The UH case is not shown because no perceptible difference in the morphodynamics is detected. For the UM case, shown in Fig. 6a, we find that the dune begins to leave behind a mass of snow that can no longer be eroded. This mass originates at the tail end of the dune, which is the oldest part of the dune as we shall see further. The dune velocity is such that there is a continuous ejection of mass from the tail as the dune continues its downwind motion. Ultimately, there is a split, where a sintered non-erodible mass of snow is left behind while a smaller barchan remains intact and mobile. In the UL case, the barchan sinters in place, and very quickly comes to a standstill. Notice that the shape and the dimensions of the barchan in this case do not change much once the sintering is activated. The morphodynamics of the two cases presented in Fig. 6 along with two additional cases are provided as Movies M1–M4 in the Supplement.

The reason for this behaviour becomes clear when we analyse the distribution of ages of the constituent cells of a dune. Recall that “age” is defined as the time since a cell transitioned to the deposited snow (DS) type and has remained as such. In Fig. 7a, the three panels show the distribution of ages on the central slice of a C24 dune for three different wind speeds with the UH and the UL cases consisting of the youngest and oldest barchans respectively. The age increases when moving from the leeward to the windward face of the barchan. The distribution in the flanks of the dune interior is also shown and it is found to be an extension of the distribution found in the central slice with no abrupt variations. It is interesting to note the stratigraphy of the dune and the distinct bands of each new layer added on the leeward face of the barchan. While the distribution indeed changes as a function of the wind speed, the banded pattern is consistent in all three panels. Furthermore, the banded pattern also highlights the fact that deposition on the leeward side of the dune occurs in pulses rather than in a continuous fashion. This is correlated to the large fluctuations to dune speeds at short timescales as described earlier in Figs. 4 and 5.

The adjoining Fig. 7b quantifies the age distribution of the three panels in the form of cumulative distribution functions (CDFs) of ages with respect to wind speeds. For the UH case, we find that all of the barchan is younger than 0.3 *t*_{s}, and thus sintering does not have a perceptible impact on its dynamics. On the other hand, for the UM case, even though most of the barchan is younger than the sintering timescale of 24 h, approximately 50 % of the barchan is older than 0.3 *t*_{s}. Thus, there is an increasing influence of sintering on the dynamics of this barchan, evidenced previously in Fig. 6a. Finally, in the UL case, almost 50 % of the barchan has ages greater than the sintering time! Thus when the effect of sintering is activated, the barchan almost immediately ceases its motion and comes to a halt, thereby sintering in place.

Recall that for each wind speed (UL,UM and UH), we performed simulations for 16 different barchans with increasing dimensions. These simulations allow us to identify the size of the barchan at which the effect of sintering is strongly felt. To do so, in Fig. 8a, we show the location of the tail of the different barchans once the sintering is activated for the UH case. The slope of each of these lines would correspond to the tail-based speed measure shown previously in Fig. 3c. With increasing size, the barchan speed decreases as previously discussed. Lines are coloured green to indicate that the barchan speed does not change due to sintering. However, at a certain barchan size, there is a transition where, upon reaching sintering time *t*_{s}, the tail no longer moves; i.e, the motion of barchan has been perturbed by sintering. We identify that for the UH case, this occurs for barchan with MSL of L_{s}=21.5 m (line coloured black); all barchans with sizes greater than this limit are also affected by sintering and show behaviour similar to that shown in Fig. 6b. A similar analysis for the UM case shows the limit to be at a barchan size of L_{s}=12.3 m. In the UL case (not shown) all the chosen barchan shapes sinter in place and thus the MSL is less than 8.8 m for this case.

These numerical experiments highlight the fact that the interplay between barchan dimensions, wind speed and the sintering rate impose a maximum length scale of any snow bedform that can remain erodible and thus mobile. For example, in the UH case (*U*_{1 m}=20.5 m s^{−1}), the largest streamwise dimension of any eDS-type bedform is limited to 21.5 m. Any bedform with dimensions greater than this limit (which perhaps arose earlier due to even higher wind speeds) will be strongly affected by sintering and will most likely sinter in place, thus converting to a neDS-type bedform. This limit decreases with wind speed and increases with the sintering rate.

In the following section, we move to a more realistic case where instead of beginning with a cone pile or even a barchan in steady motion, we directly simulate the effect of wind blowing over an initially flat fresh snow layer. As described earlier, the flat snow surface is mechanically unstable and rapidly evolves into various bedforms. Interestingly, we find that the results presented in this section remain valid there as well.

4 Results II: from transverse waves to barchans

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In the previous section, results of numerical simulations of solitary barchans were presented along with the influence of sintering on barchans in steady motion. This helped us identify the largest streamwise length scale that can exist in a mobile state with respect to wind speed and sintering rate.

We continue our investigation of the effect of sintering on snow bedforms in this section by showing results of simulations where air is blowing over an initially flat snow-covered surface. This is a more realistic scenario that can be considered to be equivalent to a scenario of strong winds after snowfall. It is also more realistic in the sense that we do not impose any particular mobile bedform (such as a barchan in the previous section); bedforms such as merged barchans, transverse dunes, snow waves and sintered immobile snow deposits emerge through self-organization of snow. Finally, we activate the effect of sintering from the first time step itself, once again reflecting our purpose to move towards simulating more realistic scenarios.

Transition of a flat granular bed to an undulating surface with various bedforms under the action of overlying fluid flow has been investigated in the past, mainly in the context of the air–sand (aeolian) or water–sand (riverine) systems. Many such studies have in fact employed a CA-based framework similar to ours. There are two important mechanisms that these studies have revealed that are relevant for the present study. Firstly, it is now understood that there is a strong link between transverse surface waves and barchans which transition from one type to another as a function of sediment supply (Nishimori et al., 1998). Lack of sediment supply causes transverse waves to break up and form barchans; on the other hand, providing additional sediment causes barchans to link up in the cross-stream direction to form transverse waves again. Transverse waves can also break up due to topographical effects and due to suppression of cross-stream turbulent diffusion of grains, once again resulting in barchans. Secondly, it has been proposed that the tendency of any mobile bedform is to continuously increase in size in the presence of adequate wind speed and sediment supply, with the ultimate limit imposed by the size of the atmospheric boundary layer for an aeolian system (Andreotti et al., 2009) (for riverine systems, the limit would be the depth of the river).

Our hypothesis is that the sintering process, over time, causes the erodible snow deposits to convert to becoming non-erodible, thereby depleting snow supply and increasing the occurrence of barchans as opposed to an equivalent system without sintering. Additionally, it would be interesting to check whether the maximum streamwise length of a mobile snow bedform found in the previous section is indeed found in this more complicated system as well.

To confirm these hypotheses we perform simulations of flow over an initially flat snow layer of depth varying as 6.5 cm, 32.5 cm, 0.65 m or 1.3 m. These simulations are denoted as H1, 5, 10 or 20 respectively, denoting the thickness in the CA height scale *h*_{0}. This set of four simulations was performed for two different wind speeds, namely the UH and UM cases as in the previous section. The entire set of simulations was repeated by deactivating sintering to provide a contrast and highlight the effect of sintering. Thus, in total 16 simulations were performed.

Each simulation has a domain size of $\mathrm{1000}\phantom{\rule{0.125em}{0ex}}{l}_{\mathrm{0}}\times \mathrm{1000}\phantom{\rule{0.125em}{0ex}}{l}_{\mathrm{0}}\times \mathrm{100}\phantom{\rule{0.125em}{0ex}}{h}_{\mathrm{0}}$ in CA units or equivalently a domain of approximately 325 m in the horizontal directions and 6.5 m in the vertical. Care was taken to ensure that the vertical extent of the domain is adequate – additional simulations performed with larger heights showed no major differences. The horizontal boundary conditions in the lateral directions were periodic.

An illustration of the evolution of such a simulation (with sintering) and the information that can be extracted is presented in Fig. 9. Top-view elevation of the surface in the UH-H20 case (i.e., *U*_{1 m}=20.5 m s^{−1}, initial snow depth of 1.3 m) is presented at *t*=0 *t*_{s} (panel a) and at *t*=50 *t*_{s} (panel b). The initially flat surface is now reorganized into an undulating surface with multiple barchans, some laterally merged barchans and also some large-scale snow deposits that are sintered (neDS-type bedforms). The surface shown in Fig. 9b is filtered to remove all eDS-type cells revealing the underlying non-erodible snow layers in Fig. 9c. Such sintered deposits cover most of the surface area with the difference between the highest and lowest points of the sintered mass being approximately 40 cm. The age of the surface is presented in Fig. 9d. The eDS-type cells are specially coloured red to highlight the fact that mobile bedforms are precisely the high-elevation regions in panel (b). Finally, in Fig. 9e, the mobile snow cells are filtered out to show the distribution of age on the surface of the sintered mass. It is quite interesting to note the large distribution of ages with many clusters of old and new deposits in close proximity. Supplement Movies M5–M7 show the full evolution from the flat surface to undulating surface consisting of barchans and sintered snow deposits.

The following two figures provide some more insights into the effect of sintering on the snow bedforms. In Fig. 10, all six snapshots of the surface elevation maps come from the UH-H1 simulation with the shallowest snow layer with a depth of 6.5 cm. The upper panels (panels a–c) show results from simulations without sintering while the simulation results shown in the lower panels (panels e–f) account for the sintering effect. For comparison, the snapshots for the two simulations are presented at the three different times. In the left column panels (a, d), there is no major qualitative difference between the simulations. Most bedforms have their dominant dimension in the cross-stream (transverse) direction and are quite limited in their streamwise extent. Moving to the middle column (panels b–e), differences between the two simulations begin to emerge. In the non-sintering case (panel b), we find that the eDS-type cells are accumulated in a few bedforms consisting mainly of barchans and a long transverse dune. In comparison, in the with-sintering case (panel e), a few small barchans are found along with a few transverse dunes. There are also a few neDS-type cells forming large patches throughout the domain. Note also the fact that the dunes in panel (b) are higher than in panel (e). In the final right column, we find that in the non-sintering case, there are now a few barchans that have grown in size while the transverse dune is still present. In the corresponding with-sintering case (panel f), the neDS cell patches have grown in size and there are few eDS-type bedforms, consisting of a few short transverse dunes and small barchans. The difference in the height between non-sintering and with-sintering simulations is even more clear in the rightmost column.

With a initial snow depth of 6.5 cm in the H1-type simulations, there is a deficit in the sediment supply needed to form large transverse waves and the initial transverse waves break up into barchans. In the simulation without sintering, the individual barchans then grow in size. This was discussed at the beginning of this section and has been shown in previous studies focussed on sand. Due to the additional sintering mechanism present in this study (and indeed in snow in reality), there is an additional curtailment of sediment available for aeolian transport and for forming bedforms. Thus the bedforms in the case with sintering are smaller, flatter and more dispersed.

To further clarify the effect of sintering on snow bedforms, we additionally remove the constraint of sediment supply by performing simulations of flow over a much deeper snow layer. These simulations denoted as UH-H20 have a uniform initial snow depth of 1.3 m, 20 times larger than the UH-H1 case presented previously. Results for the UH-H20 case are presented in Fig. 11 in a fashion similar to Fig. 10. Focussing first on the difference between panels (a), (b) and (c) in Figs. 10 and 11, note that due to adequate supply of sediment, regular snow waves are formed in the UH-H20 case as opposed to the UH-H1 case. In the case of UH-H20, the waves in fact seem to grow in both streamwise length (or wavelength) and height (or amplitude). Results in the with-sintering case (lower panels, panels d–f) are starkly different than those in the corresponding non-sintering case. Even at a comparatively early stage of the simulation, the snow bedforms in the with-sintering cases are much shorter in streamwise thickness along with shorter heights in comparison to the non-sintering case. As time progresses, more and more eDS-type cells are converted to neDS cells resulting in breaking up of the transverse bedforms and patches of sintered snow, similar to the with-sintering case in Fig. 10. At a later stage (panel f), most of the earlier bedforms have disappeared completely, resulting in a few isolated barchans and short transverse dunes. In comparison to Fig. 11c, which shows large snow waves, the results in panel (f) are more similar to Fig. 10f instead (which it must be recalled had 20 times fewer snow sediment to begin with). Sintering indeed has a large impact on the bedforms that form on snow layers!

We concluded Sect. 3 by stating that the sintering mechanism imposes a maximum length scale (MSL) that a bedform can have to remain mobile. This length scale depends directly on wind speed and the sintering timescale. We restricted our analysis to a single sintering rate of *t*_{s} of 24 h and only two wind speeds – the UH (*U*_{1 m}=20.5 m s^{−1}) and UM cases (*U*_{1 m}=12.5 m s^{−1}), which provided the maximum length values of L_{s}=21.5 m and L_{s}=12.3 m respectively.

In Fig. 12, we present the maximum streamwise length of snow bedforms present in the domain as a function of time for all simulations UH-H*α* (blue lines with symbols) and UM-H*α* (red lines with symbols), where $\mathit{\alpha}\in \left\{\mathrm{1},\mathrm{5},\mathrm{10},\mathrm{20}\right\}$. We additionally mark the limits suggested in the analysis in Sect. 3 for the UH (L_{s}=21.5 m, solid blue line) and the UM (L_{s}=12.3 m, solid red line) cases. All simulations have a maximum length scale that is ultimately below the limits suggested in Sect. 3. Thus the concept of sintering limiting the largest mobile snow bedforms, first developed from the solitary dune experiments, seems to be quantitatively applicable even in a more complex (as well as realistic) scenario of surface evolution from an initially flat surface. Figure 12 provides additional information. In particular, it is found that for all the UH-H*α* cases, the MSL initially increases up to about 20 *t*_{s}, after which it begins to decrease and ultimately falls below the MSL limit at approximately 140 *t*_{s}. For the UM case, the initial increase in the MSL is found for only the H1 case, whereas for all the deeper snow layer simulations, the MSL decreases rapidly after 1 *t*_{s} already. In the UM case it is also interesting to note that the MSL values remain constant after approximately 120 *t*_{s} and that the largest MSL is found for the H1 case. Indeed, even in the UH case, the H1 simulation shows slightly larger values of MSL compared to the deeper snowpack simulations.

In the final figure of our analysis, Fig. 13, the number of eDS-type cells in a simulation as a function of time is shown for each of the UH-H*α* and UM-H*α* cases. As the initial condition for each of these simulations, recall that we consider a flat snow layer of differing depths. Each of these simulations begins with all the cells being of the eDS type, which, depending on their age, convert to neDS-type cells during the course of the simulation. Given that the horizontal dimensions of the domain in each of our simulations are 1000×1000, the number of eDS-type cells initially in a H*α*-type simulation is *α*×10^{6} cells. The eDS-type cells essentially contain the only snow mass available for transport, the rest being sintered and permanently deposited. Firstly, the number of eDS cells decreases as a function of wind speed as shown by the curves of different colours, blue lines being for the UH case, while the UM cases are represented by red lines. This implies that there is more permanent deposition as wind speed decreases – an admittedly intuitive result. For the same wind speed, comparing the results of snow layers of differing initial depths is rather counter-intuitive. The shallowest snow layer, H1 (i.e. depth of 6.5 cm) seems to have the largest number of eDS-type cells left in the latter stages of the simulation in the UH case and throughout the simulations in the UM case. This means that for medium to high wind speeds, shallow snow layers are more mechanically unstable and resist permanent deposition due to continual transport by wind. Furthermore, this difference between shallow and deep snow layers seems to increase with decreasing wind speed – at lower wind speeds, the shallow snow layers are comparatively more unstable than deeper snow layers. This result is extremely important for polar regions, particularly Antarctica where precipitation amounts are small and wind speeds are high. The analysis presented here highlights the fact that fresh snow layers in Antarctica are mechanically highly unstable.

5 Summary and outlook

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In the first section in this study, we performed a series of numerical experiments to investigate the morphodynamics of a solitary barchan dune. A range of barchan sizes were simulated under the action of three different wind regimes representing low-, medium- and high-wind scenarios. Even without accounting for the effect of sintering, some new insights were gained since the scale of dunes simulated (𝒪 10 m), while relevant for snow bedforms, was an order of magnitude smaller than barchans found in sand (𝒪 100 m), which are more well-studied. It was found that even small barchan dunes converge to Bagnold's model for barchan speed as a function of their height. However, this convergence is achieved for very long time averages (between 18 and 36 h depending on the dune size). The instantaneous dune speeds have very large fluctuations and thus extracting any meaningful information from short time series of dune speeds is extremely challenging. While long time averaging is feasible in the framework of numerical experiments, it is highly unlikely that long time series of barchan speeds can be collected in the field. We also show that the variance of dune speeds decreases with barchan size. Finally, the effect of barchan size on dune speed is found to be far more prominent than the effect of wind speed. Overall, the motion of dunes of dimensions ranging from (L, H) = (15.7 m, 0.4 m) to (60.5 m, 1.6 m) was simulated for three different wind speeds, namely *U*_{1 m}=20.5, 12.5 and 7.0 m s^{−1}. The fastest dune had a velocity approaching 4 cm min^{−1} (dune C14, UH case) while the slowest dune had a velocity of 0.12 cm min^{−1} (dune C44, UL case). The values of the dune speeds were quite similar to those reported in literature.

Accounting for the effect of sintering on morphodynamics of barchans previously in steady-state motion revealed three types of behaviour. Dunes smaller than a threshold size were found to continue their motion without any perceptible effect of sintering. On the other hand, dunes much larger than the threshold size were found to cease motion immediately upon the activation of the sintering effect. For barchans with sizes close to the threshold size, it was found that a part of the dune becomes immobilized and permanently deposited with the remainder of the dune maintaining its downwind motion. The threshold size is determined in terms of the maximum streamwise length (MSL) of any snow bedform (in this case a solitary dune). MSL is directly proportional to wind speed and to the sintering rate. We numerically found MSL to be equal to 21.5 m and 12.3 m for the high-wind (UH, *U*_{1 m}=20.5 m s^{−1}) and medium-wind (UM, *U*_{1 m}=12.5 m s^{−1}) cases. For the low-wind cases, barchans of all sizes were immediately sintered in place once sintering was activated and thus the MSL is less than 8.8 m.

In the following section (Sect. 4) we showed results of simulations of wind blowing over an initially flat surface of a snow layer of a finite depth. We considered snow layers with four different depths and two different wind speeds for our investigations (UH and the UM wind cases). The sintering process was activated from the beginning of the simulation unlike simulations in Sect. 3. This scenario is more realistic and can be considered representative of the situation of strong wind blowing after a relatively calm snowfall event. Each simulation was repeated by removing the sintering process, thus simulating a sand-like cohesionless material. This was done to clearly show the effect of sintering on snow bedforms. Qualitatively, we found that the initially flat and uniform snow layer reorganizes into a few mobile, erodible snow bedforms such as waves, transverse dunes and barchans. As time progresses, the dimensions of these bedforms as well as their number decreases due to sintering. New, non-erodible snow deposits are found throughout the domain. These deposits are much shallower than the mobile bedforms while having larger dimensions in the horizontal direction. We find that the concept of sintering imposing a maximum streamwise length for any mobile bedform, first elucidated in Sect. 3, remains valid in this scenario as well. In spite of a large number of bedforms, each of which is changing its dimensions as well as the speed while at the same time interacting with each other, we find that the MSL in the domain is lower than or close to the limiting values found in Sect. 3 and described above.

Some additional valuable results are obtained as well. We find that whatever the depth of the fresh snow layer deposited may be, the amount of snow that remains erodible and thus available for snow transport remains the same in absolute numbers. We further find that shallow snow layers are more mechanically unstable compared to deeper snow layers and this effect is more pronounced for lower wind speeds. This result is particularly interesting for regions with small precipitation amounts and moderate to strong winds. In such a location, snow may never be permanently deposited and be continuously blown!

Cellular-automata-based modelling for snow bedforms has being introduced in this study with the intention of modelling the effect of sintering on snow bedforms and ultimately deposition. There are indeed various aspects of this study that need to be developed and advanced further to cover a full range of scenarios that would occur in reality. Firstly, a more physically based sintering model, suitable for the CA framework, should be adopted. A simple extension in future work could be to implement sintering rate as a function of mean air temperature and overburden pressure. Secondly, it would be important to implement a transition type in the CA model to account for erosion by snow-grain impacts on sintered surfaces. This erosion mechanism is not currently taken into account and thus prevents us from simulating erosional features such as sastrugi. Future works will focus on these developments. Apart from these physical modelling improvements, numerical experiments could be performed over realistic topography underlying the snow layer, which would be especially interesting for snowfall deposition in complex terrain.

There are some caveats however to the CA-based modelling approach. The model parameters, consisting of different transition rates, are free parameters that have been obtained essentially by trial and error. Upon performing a simulation, the time and length scales are established a posteriori by relating unstable modes and fluxes to those provided by theoretical formulations. We were fortunate to have been aided by previous studies using this approach in the sand community who compared it with field data in deserts. At a fundamental level, however, there is a need to constrain each of these parameters independently to physically based formulations. An attempt in this regard was made previously by Zhang et al. (2014), who used a simplified version of the ReSCAL model and derived relationships between the rate parameters and physical scaling laws. Such relationships could potentially be derived by using large-eddy simulations (LESs) of aeolian transport, the results of which can easily be translated into transition probabilities. Finally, even though in the present study we found barchan speeds to be fairly close to the few measurements that exist in the literature, new field campaigns, such as the recently published study by Kochanski et al. (2018, 2019), with a focus on surface morphology of snow surfaces, would be welcome for intercomparison and verification.

CA-based modelling could pave the way to estimate parameters such as momentum and scalar roughness lengths in a more robust manner. Recent studies have highlighted the influence of surface roughness, particularly due to sastrugi on momentum exchange between the air and the surface. One may also question the role of reorganization of snow and the formation of snow bedforms on the albedo of the surface. Consider for example, the surfaces shown in Fig. 10d–f. An originally fully snow-covered surface with a uniform depth of 5 cm has been transformed by the action of wind into vast regions where the underlying surface is exposed once again, whereas the erodible (and thus un-sintered) snow is localized in a few spots covering only a small portion of the overall surface area. How large would the differences in albedo of such surfaces be with and without accounting for wind-blown reorganization of snow?

The ultimate goal of CA-based modelling efforts would be to couple surface morphodynamics with regional-scale weather and climate models. CA-based modelling offers an extremely rapid yet robust methodology that couples aeolian transport of material and evolving surface morphology while being tightly coupled with atmospheric flow that co-evolves with the topography. An additional advantage is that it can be coupled to atmospheric models in an offline manner given the difference in timescales involved, further easing its adoption. As a future outlook, we feel that this methodology promises to be an exciting new tool in snow–atmosphere interaction study.

Data availability

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Data availability.

All data described in this article are generated using the ReSCAL model, which is provided with the right to use and modify under the GPL license. The ReSCAL model can be found at http://rescal.geophysx.org/ (last access: 1 September 2018; ReSCAL, 2018).). The parameters and computational setup are described in detail in this article. Direct model outputs can be additionally requested from the authors.

Supplement

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Supplement.

The supplement related to this article is available online at: https://doi.org/10.5194/tc-13-3239-2019-supplement.

Author contributions

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Author contributions.

VS and ML formulated the research plan, VS developed the sintering algorithm, VS and LB implemented the algorithm and performed the simulations, VS carried out the analyses and developed the visualizations, VS, and LB and ML wrote the paper.

Competing interests

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Competing interests.

The authors declare that they have no conflict of interest.

Acknowledgements

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Acknowledgements.

We thank the authors of the ReSCAL model for providing it freely with the right to use and modify under the terms of GPL. We thank Etienne Vignon, Alexis Berne and Franziska Gerber for insightful discussions and Celine Labouesse for improving the quality of the paper. The group’s East Antarctica field campaigns are further supported by the National Institute of Polar Research, Japan and the Cryospheric Research Laboratory at Nagoya University, Japan (PI: Koichi Nishimura), and their help is gratefully acknowledged.

Financial support

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Financial support.

This research has been supported by the “Local Surface Mass Balance in East Antarctica” (LOSUMEA grant) project of the EPFL, the Swiss National Science Foundation (grant no. 160667), and the Swiss Supercomputing Center (CSCS) (grant no. s873).

Review statement

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Review statement.

This paper was edited by Guillaume Chambon and reviewed by Clement Narteau and one anonymous referee.

References

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Short summary

Snow surfaces, under the action of wind, form beautiful shapes such as waves and dunes. This study is the first ever study to simulate these shapes using a state-of-the-art numerical modelling tool. While these beautiful and ephemeral shapes on snow surfaces are fascinating from a purely aesthetic point of view, they are also critical in regulating the transfer of heat and mass between the atmosphere and snowpacks, thus being of huge importance to the Earth system.

Snow surfaces, under the action of wind, form beautiful shapes such as waves and dunes. This...

The Cryosphere

An interactive open-access journal of the European Geosciences Union