Case 1. Pallavicini avalanche path

The longitudinal profile of the Pallavicini avalanche path (Loveland Pass 7.5 ft Quadrangle, Colorado) path is shown in Figure 1. The starting zone is steep for the first 80 m, and then becomes less steep for the remaining 850 m to the valley floor. Exceptional avalanches with significant air-borne contents are known to reach the road—a travel distance of 940 m (cell 105 in Fig. 1). (Travel distance is the horizontal distance from the face of the avalanche crown to the end of the debris.) Most small midwinter avalanches stop between the grade change at 400 m (cell 48) and the creek (cell 96). The flow path is divided into cells 10.0 m long, and the avalanche starting zone is assumed to be 50 m in length. Table I is a summary of the various computer runs made using AVALNCH.

Fig. 1. Longitudinal profile of Pallivicini avalanche path.

For an avalanche of height 0.75 m, the flow terminates rapidly for viscosity and friction values of 0.55. What might be considered a nominal avalanche height of 0.75 m occurs when v and ƒ ₀ are set to 0.5. Under these conditions, the avalanche reaches cell 53, a point on a local bench of the profile. Flow of a 2.0 m high avalanche slab with v=ƒ ₀ = 0.5 (run 8, Table I) ends 40 m beyond the creek, but does not reach the road. It is necessary to reduce v and f ₀ to 0.4 for an avalanche 2.0 m high to reach the road (run 10). This indicates that a deep, dry avalanche with an airborne phase is modeled with the parameters v and f ₀ set to approximately 0.4.

Case 2. Stanley avalanche path

The Stanley avalanche path (Berthoud Pass Quadrangle, Colorado) crosses a highway twice and has two possible starting zones (Fig. 2). Most avalanches released at starting zone 2 stop at or above the upper highway. Most large avalanches released at starting zone 1 stop in the reach between the two highway crossings. The slope above the upper road crossing is almost uniform except for a small grade increase at starting zone 1.

Fig. 2. Longitudinal profile of Stanley avalanche path.

The major interest here is in producing a model for the upper road which will represent adequately the different types of flow. The upper road is three lanes wide with a turnout, which is equivalent to one cell 20 m long. Two additional cells with zero slope are, therefore placed to represent the up-hill highway cut and the snowplow embankment on the down-hill side. These three cells, plus one additional cell on each side of the road are given large friction values (f ₀ = 0.9) to simulate the road, the embankments, and the irregular snow profile in the vicinity of the road. For the remainder of the path, typical snow coefficient values for midwinter hard pack are assumed with v = ƒ ₀ = 0.55.

Results from several “typical” avalanche runs are listed in Table II. One-meter-deep avalanches starting in zone 2 are trapped at the upper road, this is consistent with a number of sightings. Run 4, for a 1.5 m deep avalanche starting in zone 1, barely passes the upper road, then regains speed but stops later between the roads, another observed result. When the avalanche depth is increased to 2.0 m and the avalanche is initiated in zone 1, the avalanche crosses the lower road. Tapered starling profiles, 2.5 and 3.0 m deep at the crown and 1.0 m deep 100 m down-slope at the toe, behave in the same way as the avalanche with a uniform depth of 2.0 m.

A field observation of 4 March 1977 showed that a control-released avalanche from starting zone 1 reached a speed of 33 m s^–1 above the upper road. Most debris stopped at the upper road (cells 70–73) with a small amount reaching cell 85. The average fracture face height was 1.51 m and the average slab height in the starting zone was 1.19 m. The computation that best matches these observations is run number 4 in Table II. The greatest discrepancy is in the two velocity values, this is partially attributable to differences in the slab height, and to possible parallax errors in the field estimates of velocity.

Comparing runs 1 and 3, and 5 and 6, we conclude that the length of the starting slab does not change the flow limits significantly. Flow length could be important when the leading part of the flow fills a recess (road cut, creek recess, etc.) and the flow is long enough for the trailing part to flow over the filled recess. This phenomenon cannot be modeled exactly by AVALNCH, except that the recess can be filled by changing the profile of the path before starting the computer run. The upper road intrusion modeled for Stanley is apparently sufficient to stop the smaller avalanches, and yet it permits the larger ones to flow beyond the road. User judgement is needed when setting up these intrusion models for each separate case.

Finally, it should be noted that on the near-uniform slope in release zones 1 and 2, the avalanche velocity for the 1.0 and 1.5 m avalanches approximates to the condition, quoted by Voellmy (1955), that flow velocity reaches 80% of maximum speed after the avalanche has covered a distance equal to 25 times the initial slab depth. An alternate statement of this observation is that the avalanche accelerates rapidly at the start and then flows on at a rate close to equilibrium if the slope is constant. This physical condition is often observed in AVALNCH results.

Case 3. Max’s Mountain avalanche path

The Number 3 East avalanche path (Seward D-6 Quadrangle, Alaska) off “Max’s Mountain” (identified on map as Baumann Bump), which is 64 km south-east of Anchorage, Alaska, is shown in profile in Figure 3.

Fig. 3. Longitudinal profile of number 3 east avalanche path (Max’s Mountain).

The avalanche path is represented by 129 cells parallel to the slope, each 10 m long. There arc several rapid changes in elevation along the path, these allow us to check how well AVALNCH can handle such an uneven slope. Snow conditions are also unique, with dry snow often found at elevations of approximately 400 m, and wet, viscous snow below this elevation. All avalanches observed in the past several years have stopped on the slope or have been trapped in the gully at cell 116 with no flow onto the gun-txower bench.

Two runs were made in order to model the different conditions known to occur on this slope. In both cases, slab dimensions are set to 1.5 m depth and 40 m in extent. For run 1, a large viscosity (v = 0.7) is assigned to the slab to simulate wet snow in the starting zone. Friction is set at ƒ ₀ = 0.7 from the starting zone to cell 80, and ƒ ₀ = 0.9 to cell 129; this models moderate friction in the upper path and large friction in the lower (coastal) zone. Results show that this avalanche enters cell 115 at a leading-edge speed of 10 m s^–1, and stops in cell 116. The debris is scattered over 120 m to a depth of 0.94 m in cell 116. The maximum velocity attained by the avalanche is 20 m s^–1 at cell 12.

In run 2 viscosity was set at a midwinter value of v = 0.55 for dry snow. Friction was assumed to have a nominal value of ƒ ₀ = 0.5 up to cell 72, ƒ ₀ = 0.7 from cell 73 to cell 80, and ƒ ₀ = 0.9 for the remainder of the path. This is intended to simulate dry-release snow running on a dry upper path but onto wet snow in the lower path. Results of this run are a maximum speed of 27 ms^–1 at cell 33, with snow entering cell 115 at 10 m s^–1 and stopping in cell 116. Debris covers 90 m, to a maximum depth of 1.4 m in cell 116.

The conclusions which may be drawn from this example are that AVALNGH shows numerical stability even for cases where the gravitational components gx and gy vary rapidly or change sign. For the two flow conditions described above, the adverse grade in the runout zone is more important in determining runout distance than are frictional values along the track. The Max’s Mountain path is a good example of a formulation in which there are good physical reasons for varying the friction values along the path.

Case 4. Imogene avalanche path

The lmogene profile (Silverton Quadrangle, Colorado; Fig. 4) is modeled by 90 cells each 20 m in length. Initial flow height is 1.5 m and the extent of the starting slab along the fall line is 100 m. Viscosity is set at v = 0.5. A region of constriction from cell 30 through 51 is modeled by three different friction values.

• Run 1. Friction is set at ƒ ₀ = 0.5 over entire path. Flow velocity is found to be maximum at 26 m s^–1 in cell 16 and decreases until flow stops in cell 85, midway between the creek and the road. Debris extends over 140 m with a maximum depth of 5.5 m. The leading-edge velocity at the exit from the constricted region is 20 m s^–1.

• Run 2. Friction is increased to 0.6 in the constricted region. Flow stops in cell 85, with debris spread over 160 m, to a maximum depth of 5.5 m. The leading-edge velocity from the constricted region is 17 m s^–1, a decrease of 15% compared with run 1.

• Run 3. Friction is decreased to 0.4 in the constricted region. Leading-edge velocity from the constricting region is 24 m s^–1 (20% increase over that of run 1), the flow stops in cell 85, with debris spread over 140 m, with a maximum depth of 5.6 m.

Fig. 4. Longitudinal profile of Imogene avalanche path.

Cell 85 is the first cell of the adverse grade in the runout zone, and its effect apparently controls the flow more than do the adjustments made to friction in the constricted region. In the fluid dynamics of water, surface friction in regions of constriction decreases in importance because flow depth increases, and viscosity increases in importance because circulation increases. However, with no information known for snow, no conclusions on this point can be reached. A previous observation that v and ƒ ₀ have approximately equal influence suggests that in the case of a constriction, no adjustment need be made.

In further evaluation of this problem, AVALNCH has been modified to account for variable width of the flow. The modification is a pseudo-simulation of three-dimensional flow in which the two-dimensional flow height of each cell is adjusted each CYCLE of iteration to account for local changes in flow width. This approximation is not a complete three-dimensional formulation, for which height variation along a contour would be allowed. However, it will account for large variations in width, consistent with the accuracy to be expected when calculations are based upon the nominal slope and material properties we are currently able to establish for flowing snow.

For the variable-width program, additional input includes a width factor W (I) for each cell that can be read directly from a topographic map. One approach to setting the width factors is to select a value of unity in the starting zone and then to adjust it for down-slope cells as the width of the avalanche-track changes. In representing width changes, even abrupt changes, the factors should vary gradually, since snow entrapment will smooth even the most irregular boundaries.

To accommodate increases in height of the flow in AVALNCH due to a constriction, it is necessary to include more than one row of cells above the row in which the avalanche initially flows.

The variable-width approximation for the Imogene avalanche path is depicted by the heavy solid lines drawn in Figure 5. The shaded region is the assumed extent of the snow mass of the starting zone. The dashed lines are the assumed boundaries of the flow of the shaded mass after release.

Fig. 5. Topographic map of avalanche path Imogens from which geometric path data were taken.

Results of the variable flow calculation show that the flowing snow emerges from the constricted region of the path at a speed of approximately 23 m s^–1 and stops in cell 85. Thus, run 3 of the constant-width cases is duplicated approximately. Cell 85 is the first cell of adverse grade in the Imogene path, after flow crosses the creek bed, and is significant in stopping the avalanche. Thus, a more meaningful number for comparison of the different runs is the leading-edge velocity of the flow entering cell 85. Leading-edge velocity and final maximum debris height are listed in Table III for the three constant-width flow runs and the variable- width flow runs. The reported velocity is the average of the velocities computed for cells 80 through 84, which, by averaging, reduces local computational variations. We conclude from these results that the overall effect of the modeling assumptions on terminal flow is small, compared to the influence of terminal-zone geometry. Significant variation in snow-debris height is noted, and is attributed to the number of active cells used in the vertical range of the grid. For consistent results, one cell height should be maintained between the cell of maximum flow height and the upper boundary cell at all points along the path. If the restriction requiring accurate prediction of debris height is removed, then all models predict terminal velocities with an accuracy that is comparable to the limits encountered in selecting values for v and ƒ ₀ .