Simple model

A simple model of heat balance under nocturnal and clear-sky conditions has been developed in order to discuss the wind effect on the sublimation rate of water vapor (Reference Hachikubo and AkitayaHachikubo and Akitaya, 1997b). The heat budget at the surface is expressed as (e.g. Reference StullStull, 1988)

where R_net is the net radiation, H is the sensible-heat flux, lE is the latent-heat flux (I means the latent heat for sublimation) and G is the conductive-heat flux from the snow. These are expressed as

where ε is the emissivity of snow, L↓ is the incoming atmospheric radiation, a is the Stefan-Boltzmann constant, C_h and C_e are the bulk transfer coefficients of heat and water vapor, c_p is the specific heat of air at constant pressure, p is the air density, u is the wind speed, T is the temperature, q is the specific humidity and A is the thermal conductivity of snow. The subscripts z, s, g mean heights of z, the snow surface and a distance of Δd below the surface, respectively. In Equation (2), the value of 0.97 was used for ε (Reference Kondo and YamazawaKondo and Yamazawa, 1986). L↓ was taken to be (Reference Takeuchi, Kondo, Ganpo and AsaiTakeuchi and Kondo, 1981)

where T_b and q_h are the mean value of temperature and specific humidity in the boundary layer, respectively; T_h = T_z and q_h = q_z are assumed in this model. Equations (3) and (4) constitute what is called the bulk transfer method (Reference StullStull, 1988), and the bulk transfer coefficient C is expressed as (Reference Thorn and MonteithThorn, 1975)

where C _(N) is the bulk transfer coefficient in a neutral atmosphere, R_B is the bulk Richardson number, g is the gravitational acceleration and T_m is the mean air temperature that is supposed to be T_z. In this model the values of 3.3 × 10–³ and 2.4 × 10–³ reported by Reference HachikuboHachikubo (1998) are used as Cm of heat and water vapor, respectively, q is a function of T and relative humidity RH at height z, given as (Reference SuttonSutton, 1953)

where e _sat is the saturated vapor pressure at T(K) and p_air is the atmospheric pressure. e _sat (Pa) is empirically given as (Reference DorseyDorsey, 1968)

where a, b, c, d and e are –5631.1206, 8.2312, –3.861449 × 10–², 2.77494 × 10–⁵ and –10.66619, respectively. q_s in Equation (4) is obtained assuming that the vapor is saturated at the snow surface; then q_s is a function of T_s from Equations (9) and (10). G was calculated from Equation (5) assuming that A is 0.21 W m-¹ K-¹ for a density of 200 kg m–³ (Reference Izumi and HuziokaIzumi and Huzioka, 1975). In the field observation, a temperature profile beneath the snow surface in night-time was obtained by Reference Hachikubo and AkitayaHachikubo and Akitaya (1997a) who found a similar change between the air temperature and the snow temperature at 0.05 m depth. A good linear relation (R = 0.82) was found between T_g at 0.05 m below the snow surface and T_z at lm height from all the data from 1994 to 1996; hence T_g (K) is assumed to be a function of T_z,

where the standard deviation of T_g is 1.9 K. We may say that the snow temperature beneath the snow surface gradually changes according to the air temperature during night-time. Although Equation (11) is an empirical formula, it does not greatly affect the following result of wind dependency on sublimation.

In this model, the snow surface temperature T_s was obtained numerically by substituting Equations (2–11) into Equation (1), where T_z, q_z and u_z at 1 m height are input parameters. Accordingly, IE, i.e. the sublimation rate, can be calculated from Equation (4).

Crocus model

Crocus is a numerical model of snow cover developed for avalanche forecasting (Reference Brun, Martin, Simon, Gendre and ColéouBrun and others, 1989, Reference Brun, David, Sudul and Brunot1992). Given initial conditions (the profile of snow cover) and boundary conditions (meteorological conditions), it can simulate the subsequent time evolution of the snow cover. Crocus requires the specification of nine meteorological parameters as inputs: air temperature, relative humidity, wind speed, precipitation and its phase, incoming longwave radiation, direct and diffuse shortwave radiation and cloudiness. In this paper, 18 runs of surface-hoar formation observed from 1994 to 1996 were simulated by Crocus.

Since surface hoar develops under neutral to stable conditions, it is necessary to consider the dependency of turbulent transfer coefficients, such as C_h and C_e, on air stability. As described in Reference Brun, Martin, Simon, Gendre and ColéouBrun and others (1989) and Reference Martin and LejeuneMartin and Lejeune (1998), transfer coefficients of heat and water vapor used in Crocus depend on air stability, according to Equations (7) and (8).

Since the snow profiles (snow temperature, snow density and snow type) were not measured during the observation period, I estimated the initial conditions of snow temperature at 0.05 m depth from Equation (11), and supposed that the snow depth was 1 m and the snow temperature at the bottom kept at 0°C. The dependency on T_g as an initial condition was checked, and confirmed that the root mean square of the error was ±0.1 × 10–⁶ kg m–² s–¹ when T_g was changed within its standard deviation of 1.9 (K). “Partly decomposed precipitation particles” (Reference ColbeckColbeck and others, 1990) were specified as the snow type of the initial conditions, and the snow density was expressed as a parameter (100, 200 and 300 kg m–³). As each period of surface-hoar formation was relatively short (<14h), and the thermal environment around the snow surface was strongly controlled by radiative cooling, these assumptions are appropriate. In the simulation, the snow density is the most important parameter of snow property since it affects the conductive-heat flux from the snow and changes the heat balance.

Wind effect on surface-hoar growth

Figure 1 shows the sublimation rate plotted against wind speed. Symbols indicate the observation data sorted by a condition of R_net < –60 W m–² (i.e. nocturnal and clear-sky condition), and solid lines indicate the relations between the sublimation rate calculated with the Simple model and u_z when T_z is –7°C (i.e. the mean air temperature obtained from the observation data); relative humidity is a parameter. The results of the Simple model plotted as solid lines are in good agreement with the observation data, though the model slightly overestimated the measured sublimation rate at wind speeds of > 3ms–¹. When the relative humidity is high (90–100%RH), the sublimation rate seemed to increase with wind speed. On the other hand, when the humidity is 60–70%RH, the sublimation rate changed from positive to negative with increase in wind speed. The calculation results clearly showed that there is a specific wind speed which maximizes the sublimation rate when the air is not saturated with water vapor, whereas the sublimation rate increases with wind speed when the air is nearly saturated.

Fig. 1. Relation between measured sublimation rate and wind speed at lm height during clear-night conditions; relative humidity is a parameter. Symbols represent measurements; full lines are results from the Simple modelfor T_z = –7_aC.

The wind effect on the sublimation rate depends on the balance between the wind speed and the specific humidity difference in Equation (4); q_s means the saturated vapor pressure at T_s, and T_s which is lower than T_z in night-time increases and approaches T_z as u_z increases, so the difference between q_z and q_s decreases as u_z increases. It is important that the sublimation rate simply increases with wind speed when the air is saturated, since the increase in u_z exceeds the decrease in the specific humidity difference in Equation (4).

Reference SeligmanSeligman (1936) observed surface-hoar formation even under strong winds, while Reference ColbeckColbeck (1988) noted that perceptible winds precluded surface-hoar growth. From the results of the present observation and the Simple model, it is reasonable to conclude that Colbeck’s conclusion is applicable when the air is not saturated, and the case reported by Seligman is possible when the air is nearly saturated. Reference SeligmanSeligman (1936) noted that such a condition would be found when a warm and humid wind, in which no fog droplets have developed, starts to blow. Therefore, in a windy mountainous area, surface hoar can develop rapidly when vapor is abundant.

Snow surface temperature and heat balance

On 1–2 March 1994, it was almost clear all night and the surface-hoar crystals were observed to grow up to about 5 mm high (Reference Hachikubo and AkitayaHachikubo and Akitaya, 1997a). Figure 2 shows the time variation of the air temperature T_z at 1 m height and the snow surface temperature T_s on 1–2 March 1994. T_s of the Simple model agrees fairly well with the observed T_s. After 0400 h local time (LT) the observed T_s increased due to a thin cloud cover which increased incoming longwave radiation, whereas the model underestimates T_s by about 2–3°C. This is mainly because the light cloudy skies did not satisfy the initial condition of “clear-sky”. On the other hand, T_s simulated by Crocus is underestimated by about 2–3°C throughout this period, while variation of T_s is similar to that of the observed T_s. The error bars express the effect of the snow density (100–300 kg m–³) at the initial time; T_s is low when the snow density is low in the same meteorological conditions. This result indicates that the initial snow density affects T_s within ±1°C.

Fig. 2. Time variations of au temperature and snow surface temperature, 1–2 March 1994. The error bars around the black circles depend on the initial snow density (100–300 kg m3).

The time variation of the heat-balance components at the snow surface on 1–2 March 1994 is shown in Figure 3. Figure 3a shows the data measured directly or estimated using the observed T_s, all of which were obtained independently (Reference Hachikubo and AkitayaHachikubo and Akitaya, 1997a); the net radiation was measured with an all-wave net radiometer, the latent-heat flux was derived from the sublimation rate, the sensible-heat flux was calculated with Equation (3) and the conductive-heat flux from the snow was calculated with Equation (5). The net radiation nearly balanced with the sum of sensible-, latent- and conductive-heat flux below the snow surface. As shown in Figure 3b (Simple model) and Figure 3c (Crocus), the results of both models generally express the heat-balance components, except for the Simple model after 0400 h LTdue to the failure to consider incoming longwave radiation from clouds.

Fig. 3. Time variations of heat-balance components, 1–2 March 1994. (a) Observation, (b) Simple model, (c) Crocus model; the initial snow density is 200 kg m³.

The Simple model and the Crocus model estimated 0.218 kg m–2 and 0.209 ± 0.013 kg m–2, respectively, as the total sublimation on 1–2 March 1994 (12 h), while the observed sublimation was 0.166 kg m–2. These overestimates of the sublimation are directly due to the underestimates of T_s in Figure 2.

Estimation of the sublimation rate

In Figures 4 and 5, the sublimation rates of 18 runs of surface-hoar formation observed from 1994 to 1996 are sorted by a condition of R_net < –60 W m–2 for the Simple model, and all the data are used for Crocus.

Fig. 4. Comparison between the calculated and observed sublimation rates obtained in the three seasons January-March 1994, December 1994-March 1995 and December 1995-March 1996; the initial snow density is a parameter, (a) Simple model; only observed data with R_net < –60 W m^–2 were selected, (b) Crocus model.

Fig. 5. Comparison between the calculated and observed snow-surface temperatures obtained in the three seasons January-March 1994, December 1994-March 1995 and December 1995-March 1996; the initial snow density is a parameter. (a) Simple model; the observed data are sorted by a condition of R_net < –60 Wm². (b) Crocus model.

Figure 4 shows the comparison between the calculated and the observed sublimation rates. Good linear relationships exist for each model, but the Simple model and Crocus overestimate the calculated rate by about 0.6 × 10–6 and 1.3 × 10–kg m–2 s–1, respectively. Since the effect of snow density causes differences of ±0.2 × 10–6 kg m–2 s–1 in these graphs, the parameter of snow density seems not to affect the biases.

Figure 5 shows the comparison between the calculated and the observed snow-surface temperatures T_s. The T_s simulated by the Simple model is in very good agreement with the observations. By contrast, as we have seen in Figure 2, Crocus generally underestimates T_s by about 2–3°C when T_s is –5° to –15°C; in addition, the difference between them increases with decrease in T_s and reaches > 5°C when T_s is –20°C. In both graphs the effect of snow density on T_s increases with decrease in T_s.

Empirical transfer coefficients of heat and water vapor are often used in micrometeorology but they depend on the surface roughness, the measuring height of meteorological quantities and the air stability. In the above results of Crocus, I adopted the default values: both 3.7 × 10–3, for C_h and Ce. These values of C_h and C_e are much larger than those obtained by Reference HachikuboHachikubo (1998), which have been adopted in the Simple model.

The relation between the sublimation rates calculated by Crocus and the observed ones is shown in Figure 6; C_e is a parameter. Reference Martin and LejeuneMartin and Lejeune (1998) stated that the turbulent fluxes such as H and IE are little affected by the aerodynamic surface roughness which decides C_h and C_e. In Figure 6, the relation is little changed and confirms that the slope of the regression line decreases as C_e decreases. By contrast, T_s is greatly underestimated when C_e is 2.4 × 10–3 in Figure 7, which indicates that the heat balance at the snow surface is not well reproduced. While Reference Martin and LejeuneMartin and Lejeune (1998) concluded that the parameterization of turbulence is highly dependent on the site, and no universal or simple formula can be determined, the bulk transfer coefficient is not the cause of the bias, as we have seen in Figures 4b and 6. This is an unresolved problem and needs further consideration.

Fig. 6. Sublimation rate calculated by Crocus plotted against the observed sublimation rate. Continuous and dotted lines are the regression lines when C_e is 3.7 × 10–³ and 2.4 × 10–³, respectively. The initial snow density is 200 kg m–³.

Fig. 7. Snow-surface temperature calculated by Crocus plotted against the observed snow-surface temperature when C_e is 3.7 × 10–³ and 2.4 × 10–³. The initial snow density is 200 kg m–³.