2.1. Friction law

The friction law used is from Reference PouliquenPouliquen (1999). The effective friction coefficient is written as:

where B; μ_min= tan(θ_min) and μ_max = tan(θ_max) are parameters depending on the material properties and the bed roughness. B is linked to the parameters β and L defined in Reference PouliquenPouliquen (1999) by the following relation: B = β/Ld; where d is the mean diameter of the particles. We considered that the friction coefficient changes discontinuously at the Froude number 0.136, below which steady granular flow has been found to be impossible (Reference PouliquenPouliquen, 1999).

2.2. Entrainment and deposition model

The entrainment and deposition model (Reference Naaim, Faug and Naaim-BouvetNaaim and others, 2003) assumes that the erosion/deposition rate is proportional to the excess or deficit shear stress at the bottom and uses the empirical functions h_stop(θ) (defined in section 4.1) and h_start(θ). h_start(θ) is deduced from h_stop(θ) by h_stop

The deposition model is given by:

The erosion model is given by:

In our simulations, we assumed :

corresponding to a linear profile, and we used γ = 1. Through the extended previous works concerning the vertical velocity profile inside the granular flows (from Reference SavageSavage (1979) to Reference Andreotti and DouadyAndreotti and Douady (2001)), different profiles were exhibited. According to the flow and to material conditions, the velocity gradient at the bottom can be higher or smaller than the mean gradient. For simplicity, we approximated the bed velocity gradient by the mean velocity gradient.

The numerical solution of the full equations system is obtained using a finite-volume scheme. The topographic profile is recalculated after each time-step calculation, taking into account the deposition flux. The deposition condition corresponds to the deceleration condition. When it is reached, both deposition and deceleration start to operate. The deceleration decreases the velocity, and the deposition decreases the height. These two processes operate simultaneously and maintain approximately the same shearing rate (u/h) during the stopping process.

2.3. Upstream and downstream boundary conditions

The downstream condition represents the presence of the obstacle. This last is introduced in the model as follows. Three cases are considered:

When h_t, the sum of the flow height h and the deposit height h_d at the boundary condition, is lower than the obstacle height H, a total reflection of the flow is used.

When the obstacle height is between (h_t) and the deposit height (h_d), the output flow (Q_o) is determined according to the incoming flow (Q_i) by:

Finally, when h_d exceeds H, the downstream boundary is considered free (Q_o = Q_i).

The first and last cases require classical treatment. The intermediate case is not common. The flow is clearly three-dimensional.We roughly simplified the problem by assuming the flow rate proportional to the free area. At the down-streamboundary condition, when the flow arrives, the total reflection induces a strong local increase in height. This generates a strong gradient height, which implies the start of deposition according to the deposition model. This process changes the topography till the dam is totally filled with the immobile material. This modification propagates upstream till attaining an equilibrium slope.

4.1. Empirical friction-law parameters

As seen in section 2, empirical friction parameters are needed for implementation in the numerical model. The function h_stop(θ) corresponding to the thickness of the granular layer left by a steady uniform flow at the inclination θ was determined empirically by a specific experimental procedure detailed in Reference Pouliquen and RenautPouliquen and Renaut (1996), Daerr and Douady (1999), Reference PouliquenPouliquen (1999) and Reference Pouliquen and ForterrePouliquen and Forterre (2002).

The granular material used was glass beads flowing down a sandpaper roughness. The h_stop(θ) empirical function corresponding to our experimental conditions is given in Figure 2. The value of θ_max corresponding to h_stop = 0 was determined accurately and was found to be equal to θ_max = 28 ± 0.5˚. Several couples (θ_min; B) can be used to fit the experimental data with the equations in section 2.1. The extreme values we obtained lead to:

Fig. 2. Variation of the stopping angle as a function of the thickness h. This curve was obtained for glass beads 1 mm in diameter and flowing down a rough plane with sandpaper roughness. Uncertainties were estimated around Δθ = 0.5˚ for the slope angle and θh = 1 mm for the thickness h of the granular layer.

The following parameters were used to describe the friction law implemented in the numerical model: μ_max = 0.53 (θ_max = 28˚), μ_min = 0.38 (θ_min = 21˚) and B = 34m-¹.

4.2. Influence of the obstacle height

The empirical friction law implies three distinct types of deposition mechanism:

θ < θ_min: the entire released volume is deposited before interacting with the fence. This case wasn’t therefore treated;

Experimental and numerical results are presented in Figure 3. The released mass was fixed to 7 kg, and the obstacle height was varied from H = 1cm to H = 8 cm. One can observe that the model correctly reproduces the experimental data. However, concavities of numerical and experimental curves are opposite for low obstacle heights, and the error increases when the obstacle height decreases, except for values close to zero where the curves converge: at zero for the case of θ > θ_max and at V_s(h_stop(θ))/V for the other case. The numerical model overestimates the volume stored for low obstacle heights and underestimates it, but less substantially, for higher obstacle heights.

Fig. 3. The retained volume and initial volume ratio according to obstacle height and initial height ratio: comparison between the computed and observed data for two slope angles, 24.5˚ and 29.5˚.

4.3. Influence of the channel inclination

The released mass was 7 kg, and the channel inclination was varied from θ = 22 to θ = 38°. The ratio of the fence height to the height of the initial volume released, H/h_i, was fixed at 0.3 in order not to saturate the volume stored behind the obstacle (V_s = released volume) for low slope inclinations. As shown in Figure 4,

Fig. 4. Retained-volume/initial-volume ratio according to slope angle at fixed initial volume and fixed obstacle height (H/h_i = 0.3).

However, we have to remember that the friction parameters (θ_min; B) were determined empirically with a significant error for θ_min (21˚ ± 1˚) and B (34m^–1 ±7m^–1), as explained in section 4.1. These errors partially explain the discrepancies in Figures 3 and 4. The model was built using quasi-steady uniform conditions, whereas the considered flows are far from these conditions. Furthermore, the impact effect when the front attains the obstacle is not considered in the model. Finally simple boundary-condition treatment was used.