2.1 Description of an avalanche

A schematic representation of the reality being studied is necessary for mathematical modelling. Couloir geometry is defined by a series of cross-sections, in other words the intersections of planes which are perpendicular to the line of greatest slope with respect to terrain relief. That schematization (Fig. 1) allows us to represent a one-dimensional flow.

Fig. 1. Diagram showing schematic representation of couloir cross-section.

Let s be the wet area, l the width at the surface, h the snow depth, and R the hydraulic radius. Then in order at least partially to escape from the restrictions due to the indeterminate value of snow density p during flow, we consider the variables S = ps (units kg/m), H = ph (units kg/m²), and P = VS (units kg/s). The variable P represents snow flow rate; V is the average velocity of flow in the section parallel to the couloir axis. In such a model, we are not attempting to define the exact distribution of specific speeds at a given moment, as this would entail too much; we are calculating an average speed. Subsequent exploitation of our results requires that this be taken into account.

In addition, we have schematized the sections in the following theoretical form.

where k and n are variables along the couloir axis.

2.2 Hypotheses

We suppose the free surface to be horizontal in a cross-section and, connected with this, the distribution of pressures to be hydrostatic. These suppositions are an absolute requirement for the derivation of simple equations. During flow, snow density varies as a function of snow speed and depth. As we do not know this law, we have tested the following form of variation:

where ρ ₀ is the density at rest, V ₀ the threshold speed at which ρ varies, and α the coefficient of variation. This obviously questionable law was introduced to attempt to quantify the influence of density.

Friction is represented in the form of a polynomial in V:F _p = f _s+f ₁ V+f _t V ² in which the three terms traditionally represent static friction, laminar friction, and turbulent friction. The coefficients of friction are selected on an a priori basis as a function of couloir roughness and geometry.

2.3 Equations

Flow equations for snow can be established by simple balance considerations. Conservation of the snow mass in motion requires

The momentum equation can be written

These equations apply to the entire flow with the exception of the frontal zone, for which we use equations of the “mobile jump” type; continuity implies

and dynamics give

where W is the advance velocity of the avalanche front and S ₀ the entrainment of existing snow by flow at the front level. The dynamic equation is obtained by means of a supplementary hypothesis being that pressure forces are preponderant and that friction at the bank as well as gravity in the frontal zone do not have to be taken into consideration. Eliminating W between the two front equations gives an equation F(P, S)=o which can be used as a boundary condition for up-stream flow. Front velocity W is computed using the continuity equation after solving the flow equations.

2.4 Boundary conditions—initial conditions

Activation of flow when the avalanche starts is calculated by a mass-balance equation and an approximation of velocity. The free surface, in fact, is not horizontal in the section of the avalanche at its origin. On the other hand, as soon as there is a question of motion, this hypothesis becomes valid. Total snow mass, therefore, is considered with the context of motion applied (surface area of the point of origin times average depth of snow times apparent density of in-place snow) and snow depth is calculated for each flow cross-section in order to conserve this mass. The Voellmy formula is used to approximate velocity. The variability of initial conditions has little relevance to the following stages of the calculation, provided that the mass-balance equation is respected.

The phenomenon of snow entrainment up-stream of the avalanche front is not well known, and the mathematical model elaborated schematizes this recovery with the supposition that a given snow depth h ₀ (provided by the user in each section) is completely recovered at the avalanche front level (Fig. 2, diagram ).

Fig. 2. Method of entrainment of snow by avalanche front assumed in the model (left) and as it is thought to occur in physical reality (right).

Actual entrainment is more probably gradual, in other words, partial recovery at the avalanche front level followed by recovery through the action of the snow in motion (Fig. 2, diagram ). Through the intermediary of equations expressing the front, this recovery represents the down-stream limit condition of the model. We consider snow flow rate to be zero up-stream.

2.5 Solution

For solution of the system of partial differential equations we have selected a method using finite differences with an implicit solution. This type of method is commonly used in the mechanics of fluids It allows us to calculate the progression of the variables S and P at each point in time. For a simulation, the computer program requires 16000 words, 1.5 min using an Iris 80 (C II) computer, which represents a total cost of approximately 75 F.Fr. This limited cost makes it possible to perform any simulations required using different coefficient values and snow-data elements.

3.1. Sensitivity analysis

In order to test how the model functions and the influence of the various hypotheses, we have conducted several simulations which make it possible to isolate the fundamental ideas required for comprehension of avalanche phenomena. The values of the coefficients used and of the geometry are given in Tables I and II respectively.

Friction

Figures 3 and 4 clearly show that, depending on the value selected, the model can give extremely varied results The approach based on expressing friction in terms of a polynomial necessitates a setting of three coefficients and therefore the obligation to develop experience through comparison with observations. We consider this to be indispensable, and clearly Figure 1 demonstrates the influence of static friction on avalanche advance, which tends to prove that the period of time during which the snow is driven at high velocity (at a given abscissa) is limited in relation to the duration of flow. Figure 2 demonstrates the high degree of sensitivity obtained with the value assigned to the turbulent friction coefficient f _t for the velocity of advance of the front.

Table I. Values of coefficients

Table II. Geometry

These figures make it possible to prove that overall flow factors determine front velocity, which clearly establishes the value of complete simulation models. The static friction coefficient and depth recovery largely determine avalanche stopping.

Apparent density

Model sensitivity (Fig. 5) is not as distinctive as with friction. In reference to observations, we consider it reasonable to apply an “avalanche no. 11” type law to represent this phenomenon.

Geometry variations

When the couloir widens abruptly, flow obviously does not strictly follow the banks. By analogy with hydraulic flow, we restrict widening to 15^° angles in the form given in Figure 6; beyond this limit equations are no longer valid. It should be noted, however (Fig. 7), that an abrupt widening (avalanche no. 12) results in a sudden braking of avalanche advance. Widening and narrowings of the couloir slow down the advance of the avalanche front, but do not have much effect on avalanche velocity itself. As a result, it appears that variable geometry cannot be relied upon to restrict avalanche advance. For this purpose, breaks in slope are much more efficient.

Fig. 3. Influence of static friction coefficient f_s on the flow curve of an avalanche. For avalanche I, f_s = 0.2. For avalanche 2 it falls to zero if v > 3 m/s. For avalanche 3 it falls to zero if v > 6m/s.

Depth of entrainment

Insufficient knowledge of the stresses involved in contact between the avalanche and in-place snow, as well as the relation between the entrainment and the value of these stresses, have not enabled us to build a mathematical model representing this phenomenon. Avalanches 14 (2 m of entrainment) and 15 (5 m of entrainment) emphasize the importance of this parameter (Fig. 8). For a considerable entrainment, the avalanche is slower at the outset due to more energy being required to set the snow into motion, then it is launched and acquires a much higher speed. In addition to this, the extent of entrainment largely determines the zone in which the avalanche stops and consequently the localization of avalanches.

Avalanche stopping

There are two problematical elements with respect to avalanche stopping; the first is description of the flow: when an avalanche reaches a widened zone, it does not generally spread out over the entire width, but divides up into forks, the localization of which can be observed on site. In this case, simulation consists in considering all or part of the avalanche, and limiting its impact to the width of the fork. This simulation can be performed for any advisable hypotheses. The second difficulty resides in modelling how the avalanche stops itself; to do this we compare the forces in such a way that an inverse relationship is obtained; as soon as the force due to static friction exceeds the sum of the forces due to inertia, pressure, and gravity, the avalanche is stopped.

Fig. 4. Influence of the turbulent friction coefficient f_d on the flow curve of an avalanche. For avalanche 4, f_d = 30 x 10^-3. For avalanche 5, f_d=15 x 10^-3. For avalanche 6, f_d = 5 x 10^-3.

Fig. 5. Influence of the coefficient of variation of apparent density α on the flow curve of an avalanche. For avalanche 7, α = 0. For avalanche 8, α = 0.1. For avalanches 9 and 11, α = 0.3. For avalanches 10, α = 0,5. In all cases except avalanche 11, V₀ = 0, and for avalanche 11, V₀ = 6 m/s.

Fig. 6. Diagram to show limiting widening for which the avalanche follows the banks.

Fig. 7. Influence of the widening on the flow curve of an avalanche. For avalanche 12, the widening is abrupt. For avalanche 13, the widening is progressive.

Fig. 8. Influence of the depth of entrainment on the flow curve of an avalanche. For avalanche 14, h₀ = 2 m. For avalanche 15, h₀ = 0.05 m.

Figure 9 shows avalanche stopping for three hypotheses about the depth of entrainment. A comparison of avalanches 16 and 17 show us how the stopping distance (avalanche 16, 100 m; avalanche 17, 40 m) is determined by flow inertia; the first case is slow (v ≈ 5 m/s) but the flowage represents a considerable mass; the second case is faster (v ≈ 10 m/s) and lower in mass, which results in rapid deceleration. Finally, these two avalanches stop at approximately the same point. Avalanche 18 is a more particular case: a sharp variation in depth of entrainment causes it to stop suddenly, and in this case, “the wall of snow” plays the role of a dam.

Fig. 9. Three cases of the termination of avalanches. Avalanche 16 encounters a progressive increase in the depth on entrainment up to h₀ = 3 m at x = 1100 m. Avalanche 17 has a much slower increase in the depth of entrainment up to h₀ = 3 m at x = 1300 m. Avalanche 18 encounters an abrupt increase in the depth of entrainment from h₀ = 0.05 m to h₀ = 3 m at x = 1060 m.