3.1. Comparison with Observations
The model performance over the two days is first evaluated with the sounding data of Wenjiang station. As shown in
Figure 3, the inversion layer near the surface is captured, except for 08:00 LST 1 October. The intensities of the simulated inversion layer of the other three times are a bit weaker compared to the observations. On 1 October, simulated temperatures of the upper layer are quite close to the observations, while temperatures from 1500 m to 3000 m on 2 October are overrated, and above 3500 m are underrated (not shown). As for the wind profile, the characteristics of calm wind near the surface are well represented by the model. The whole layer atmosphere of the former day agrees well with the sounding data. On 2 October, the observed wind of the upper layer changes slightly from northerly to westerly, while the transition shown by the simulation results is a bit late.
The time series of 2 m air temperature, 10 m wind speed and wind direction for the simulation are obtained from the grid point in D4 closest to each station. The comparison between the simulated and observed 2 m temperature shows that the model reproduces the hourly 2 m temperature trend reasonably (
Figure 4). In the early morning and daytime of the two days, the model underestimates temperatures by 1–2 °C. The simulated nighttime cooling rate of 2 m temperature is slightly larger than the observation. While in the other periods of the days, the model displays more accuracy, except for the Jianyang station, where the maximum deviation between simulation and observation can reach 3.2 °C. The discrepancy might be caused by the difference between model terrain height and actual elevation. Moreover, the air temperature at Jianyang might be affected by the Tuojiang River, which is not reflected in the land use data.
Since the mountain oriented in the southwest-northeast as shown in
Figure 2b, the wind direction range of the plain breeze on the west side of the Longquan Mountain is identified as 210–30°, and similarly, 30–210° on the east side. The mountain breeze is defined to the contrary. Jintang, Longquan are most affected by the Longquan Mountain. From the observed wind direction of the two stations, diurnal variation from the southwest at night to the south-southeast at day can be clearly recognized under the circumstance of prevailing southwesterly wind (
Figure 5). Comparing simulated wind direction with the observation, it is notable that the simulations show less diurnal variation over the two days. As for the wind speed in
Figure 6, the simulated pattern is slightly lagging compared to the observations. Moreover, the model predicts stronger airflow during the day. This phenomenon has been reported by many previous papers and improvement measures have been carried out effectively [
33].
The vertical and near-surface characteristics obtained from the model result show an adequate representation of the regional boundary layer behavior and development despite understandable bias. Thus, the simulation result can be used to study the three-dimensional characteristics of the mountain-plain breeze circulation around the Longquan Mountain.
3.2. Horizontal Structure
Since the two consecutive days show similar features of wind and temperature field in
Figure 4,
Figure 5 and
Figure 6, the meteorological fields from 08:00 LST 1 October to 08:00 LST 2 October are mainly analyzed. The results of the second day are treated as verification and supplementary explanation.
As shown in
Figure 7, there is a significant thermal contrast between mountain and plain area. For most time of the day, the 2 m temperature over the mountain area is lower than that over the plain area due to the higher altitude. At 10:00 LST, air parcels over the mountain are heated faster than the plain air at the same height, causing flows to move from both sides of the mountain to the ridge, i.e., the plain breeze. The plain breezes are more noticeable in the north and south portion of the mountain, compared to the middle portion where the terrain elevation is lower and intercepted by the Tuojiang River. With the constant surface heating during the day, the turbulent movement near the ground is enhanced, favoring the increase of surface wind speed (
Figure 7b). At 17:00 LST, the plain breeze in the south portion starts to weaken and is gradually replaced with mountain breeze. The plain breeze in the north portion, by contrast, can persist until 18:00 LST. For the nighttime and early morning periods (from approximately 19:00 LST to 07:00 LST of the next day), the model simulates a well-defined mountain breeze due to the nighttime cooling effect. At this period of time, coinciding with the location of urban and build-up shown in the land use map, the temperature in the urban area of Chengdu is higher compared to the rural area. Liu et al. [
34] showed that at the urban area, the warming effect decreased slower compared to the rural area at night, resulting in higher temperature as known as urban heat island.
It is worth noting that, in
Figure 7d, higher temperatures are found over the mountain slope area. This phenomenon is uncommon because the mountain terrain rises higher than the plain and thus normally results in lower surface temperature. Intensive automatic meteorological observational data is used to examine this phenomenon. As seen from
Figure 8a,b, the observed curves for both mountain and plain temperature are higher than the simulated ones. This corroborates what we found in
Figure 4—that the model tends to underestimate the temperatures in most time of the day. In the daytime, the mountain temperature is lower than the plain temperature for both simulated and observed curves, whereas the model tends to weaken the temperature difference between the mountain and the plain compared to the observations (
Figure 8c). During the night of the two days (around 20:00 LST to 09:00 LST of the next day), the averaged 2 m temperatures in the mountain area are higher than that in the plain, which confirms our finding in
Figure 7. The cause of this phenomenon is the steady inversion layer in the Chengdu plain. Within the inversion layer, the air temperature gradually rises with increasing height and thus, resulting in lower surface temperature over the plain area and the higher surface temperature over the mountain slope. Furthermore, it can be found that the observed temperature difference between the mountain and plain reaches the maximum in the first half of the night, while the simulated one reaches the maximum later.
To further scrutinize the different characteristics of the mountain-valley winds in each portion of the Longquan Mountain, time-zonal cross sections of U- and V-components along latitude 30.9° N, 30.7° N, and 30.4° N are examined as the representatives of the north, middle, south portion, respectively. Along 30.9° N (
Figure 9a), the cross-section of the mountain terrain height is higher and wider compared to the other selected latitudes. The U-components of the winds on both sides of the mountain exhibit periodic changes over time. The convergence flows are symmetrically distributed along the top of the mountain during most of the daytime, from 08:00 to 17:00 LST on 1 October and from 11:00 to 17:00 LST on 2 October, lasting for about 5–7 h. The convergence flow starts turning into divergence flow at around 22:00 LST on 1 October and 18:00 LST on 2 October, lasting for about 10–14 h. It is worthwhile mentioning that the onset time, the end time of the mountain-valley breeze and the wind field characteristics on both sides of the mountain vary slightly over the two days. This is particularly evident in the wind strength. The divergence flow on the east slope is stronger than that on the west slope due to the enhancement by the prevailing westerly wind on one hand. On the other hand, this phenomenon might be connected with vertically propagating mountain wave, and will be described in detail in the following pages.
In comparison, the cross-sections along latitude 30.7° N and 30.4° N are less capable to reflect the cyclical changes. The mountain terrain at 30.7° N is shorter compared to 30.9° N and corrugated with shallow valleys, which is insufficient to induce the regular daily wind shift. Along 30.4° N, the convergence, divergence flows, and wind shifts are harder to recognize compared to 30.9° N. The differences of wind fields among each portion of the mountain prove the impact of the topographic condition on the mountain-valley breeze.
3.3. Vertical Structure
Horizontal convergence inevitably leads to vertical motion.
Figure 10 shows the vertical wind on the first model level at each time corresponding with
Figure 7. In
Figure 10b, as the surface longwave radiation continues to heat up the atmosphere after sunrise, stronger upflows are formed, especially in the north portion of the mountain, which supports the obvious convergences in the day found in
Figure 9a. While in the middle portion, only weak vertical motion with speed of −0.1~0.1 m/s appears. In the east slope of the south portion, there even exists a weak downflow, which is agreed with the uniform westerly wind during the daytime of 1 October shown in
Figure 9c. After about 18:00 LST, the upflows in most areas of the mountain start changing to downflows, while the intensities of the downflows vary in the different portions of the mountain. This vertical motion inconformity further proves that the heterogeneity of the mountain terrain indeed causes the differences in mountain-valley breeze circulation. Corresponding with the nocturnal stronger divergence flow on the eastern slope in
Figure 9a, the stronger downflows show up on the eastern slope in the north portion of the mountain at 04:00 LST on 2 October.
Figure 11 shows the vertical cross section of the wind field (U- and W-components), potential temperature and water vapor mixing ratio along 30.9° N. At 10:00 LST, the nocturnal stable boundary layer transforms into neutral or convective boundary layers and the atmospheric boundary layer rises up to a certain height. A horizontal thermal gradient between the mountain top and plain is established due to the difference in heating rate (
Figure 11b). Prevailing easterly winds can be seen in the upper layer from the cross-section, overlies a shallower westerly flow on the western plain, which is gradually thickened in response to the turbulent movement induced by the heated ground surface. The flows on the western and eastern plains converge at the mountain top area. Coupling with the westerly flow, the plain breeze on the western plain leads to a stronger upflow compared to the eastern side, yet it is still not strong enough to arouse a well-defined plain breeze circulation at this moment (
Figure 11a). As seen in
Figure 11c, the maximum value of the water vapor mixing ratio occurs near the ground. The water vapor on the western slope is advected to a higher altitude by the stronger upflow compared to the eastern slope, causing a higher extent of the water vapor mixing ratio on the western slope.
At around 13:00 LST, the upflow of the plain breeze along 30.9° N grows stronger up to 1.8 m/s, while the plain breeze circulation at this moment is covered by the vigorous turbulent movement generated by the surface heating. At 16:00 LST (
Figure 11d), compared to the morning period, the convergence flows appear more distinct and intense as well as the return flow according to the zero lines of U-component. At this moment, the updrafts can reach 1.2 m/s. Although the vertical turbulence reduces the tendency of the outer part of the plain breeze circulation, we can still discern the outer edge of the circulation by the zero lines of the U-component. The boundary layer elevates to a maximum height of 1516.4 m AGL (2008.4 m ASL) at this time, and the shallow westerly flow at 10:00 LST develops much thicker. Adler and Kalthoff [
35] denote that the boundary layer over complex terrain is governed by multiple processes such as convection, thermally- and dynamically-driven flows, which are all responsible for the higher reaches of the boundary layer than the one over flat terrain. It is also well noted that, above the boundary layer (approximately from 2.1 km to 3 km AGL), a fluctuation forms downwind from the mountain top. This agrees with the findings of Conrick et al. [
36] that the Kelvin-Helmholtz instability is likely to develop over complex terrain when there is a veering in wind direction. In
Figure 11f, the water vapor mixing ratio distributes more evenly within the boundary layer, whereas the maximum value reduces compared to the morning time. The water vapor mixing ratio on the eastern slope is still distinctly less than that on the western slope.
After sunset, when solar radiation gradually weakens, the stable boundary layer establishes again from the bottom up, characterizing with the dense and horizontal isentropes (
Figure 11h). The cold thermally-driven mountain breezes start blowing divergently from the mountain top to the plain on both sides at around 20:00 LST. An obvious anticlockwise flow circulation is induced in the eastern side of the mountain where the isentropes curve congruently as the lee side downflow (
Figure 11g). At the same time, the mountain waves tend to develop vertically and tilt upwind with height. According to Jackson et al. and Adler and Kalthoff [
37,
38], the dynamically-driven downslope winds bring dryer and warmer air to the leeward slope due to the adiabatic motion and cause the concave portion of the isentropes. Since the synoptic background is moderately stable and no significant wind shear exists above the mountain top [
37], vertically propagating mountain waves are formed on the leeward side of the mountain. To summarize, the anticlockwise circulation on the eastern flow is resulted from the coupling of mountain breezes and downslope winds. In terms of the water vapor mixing ratio, without the upflow in the daytime, the isolines of water vapor mixing ratio tend to be straight and flat (
Figure 11i). The downslope wind on the leeward slope brings dryer air from the upper level to the lower level, leading to the concave shape on the eastern side of the mountain. The water vapor mixing ratio near the ground reaches its maximum before the sunrise.
In general, the background wind forcing and the turbulent movement have a great influence on the behaviors of the mountain-plain breeze circulation, but are not sufficiently strong to prevent the formation and the emergence of it. Although the thermal circulation in the Longquan Mountain area is not as apparent as those in the large mountain chains due to the comparatively gentle terrain, the model is still able to capture the characteristics and the evolution of the local circulation. It is also worth reminding that the cross section discussed above only represents a fragment of the given latitude, the general behavior of the mountain-plain breeze circulation can be more clearly seen from
Figure 7,
Figure 9 and
Figure 10.
3.4. Turbulence Characteristics
Turbulence can be generated thermally by buoyancy effects (thermally-driven mesoscale circulations during the daytime) and mechanically by shear (low-level jets during the nighttime and mountain waves) in mountainous regions [
19,
39]. At the same time, turbulence in the boundary layer plays an important role in the exchange of energy and pollutants. Therefore, the turbulence characteristic and the impact of turbulent fluxes on the mountain-plain breeze circulation in the study area are analyzed in this section.
In
Figure 10 and
Figure 11, turbulences with the form of up-and-down, ruleless flows can be identified at both 10:00 and 16:00 LST. We first investigate TKE as a general measure of the turbulence intensity. In
Figure 12a, the TKE is mainly distributed within the convective boundary layer during the daytime and is almost zero after sunset. At 14:00 LST on both of the days, the averaged TKE reaches the maximum value.
Comparison of the averaged TKE profiles for mountain and plain regions at 14:00 LST is further performed, as shown in
Figure 12b. In the range of tens of meters above the ground, the TKE increases with height since the dissipation rate in the TKE budget equation is largest near the surface during the daytime [
40]. The height at which the maximum appears matches well with the conclusion in
Figure 12a. For the mountain area, the value of the averaged TKE tends to be larger compared to the plain at two heights ranging approximately from the ground to 1200 m and from 1700 m to 2100 m. In places with higher topographic height, air parcels within the boundary layer are more easily heated by the ground, resulting in a larger positive buoyancy term and a larger TKE value in the lower half of the boundary layer. As for the larger averaged TKE value of the mountain region in the upper boundary layer, it could be resulted from the effect of KH waves, after which can later degenerate into less organized turbulences [
41].
Since turbulence plays a crucial role in transferring the energy between the surface and the lower atmosphere, it modifies the distributions of these variables and the atmospheric stability. Therefore, we further examine the turbulent fluxes of heat, moisture, and momentum to elaborate on the formation and evolution of the local circulation.
In the parameterization of boundary layer turbulence, horizontal turbulent flux is often neglected compared to vertical turbulent flux since it is much less than the latter. The turbulence flux of any constituent can be represented as a covariance: , an unresolved second-order moment in the movement equation representing the energy transport by turbulent eddies, where is the vertical velocity and the primes denote the fluctuation. For is negative, the constituent is transported downwards by the turbulence, and for is positive, it is transported upwards.
Figure 13 shows the cross-sections of the turbulent heat fluxes along 30.9° N and the diurnal cycle of the maximum turbulent heat flux and the height at which the maximum value appears. Potential temperature is used to measure the heat transport instead of virtual temperature since the latter includes the adiabatic variation. Usually, turbulent fluxes move quantities from higher to lower values. As the atmosphere above the convective boundary layer is stable, i.e., potential temperature increases with height, it is reasonable that the turbulent flux of potential temperature is negative throughout the lower atmosphere in the night or above the convective boundary layer in the daytime.
At 09:00 LST, positive turbulent fluxes of potential temperature start to establish near the surface and gradually develop upwards, since the ground surface acts as a heat source during the daytime. The air closest to the surface is heated first, then with the continuous heating, the heat energy accumulates and transfers to a higher level by turbulent eddies. Around this time, the turbulent heat fluxes in the upper half of the boundary layer appear to be negative, suggesting a substantial amount of air is entrained from the free atmosphere to the boundary layer [
42]. The maximum of the turbulent fluxes of potential temperature locates near the surface, with the value of 0.2 K m/s occurs at 13:00 LST. The conclusion can be further proved in
Figure 13d. The maximum of turbulent heat flux shows a distinct diurnal cycle in these two days. The height of the maximum value does not change much during the day, and remains near the ground.
At around 18:00 LST, the positive values in the lower level of the boundary layer vanish. During the nighttime, the maximum value remains around zero, as seen in
Figure 13d, while the height of the maximum value is large and irregular. In correspondence with the downslope flows in the nighttime, negative values of turbulent heat flux present on both sides of the mountain after 20:00 LST with larger absolute values on the eastern side, indicating weak eddies in nocturnal stable boundary layer moving warmer air downwards.
In general, the specific humidity is greatest near the surface and decreases with the height since the Earth’s surface is also the moisture source. Hence, as shown in
Figure 14, the turbulent moisture flux is positive in most situations. Similar to the turbulent heat flux, the biggish positive value of moisture flux near the ground appears at 09:00 LST and develops upward hereafter. At around 15:00 LST, the turbulent moisture flux reaches the maximum of 471.1 × 10
−6-m/s and the height of the maximum value is 2221.4 m. Unlike the vertical distribution of the water vapor mixing ratio, the position of maximum turbulent moisture flux is in the upper part of the boundary layer.
Figure 14d generalizes this feature. As the maximum value of daytime turbulent moisture flux increases, the height at which the maximum value is located increases as well.
Figure 14d also shows that the position of maximum value keeps remaining at a certain height even if its value has already decreased at around 17:00–21:00 LST. The cause is that with the constant surface heating, a large amount of moisture is evaporated into the nearest air and result in a nearly saturated relative humidity, which in turn reduces the evaporation rate near the ground; the perturbed moisture that has been transferred to the midair remains at certain height while its value is decreasing. Therefore, we can see that over the mountain area and the downstream in a certain distance, the positive turbulent moisture flux can rises to a fairly high level and even penetrate into the free atmosphere in
Figure 14b. This can be conducive to the reduction of local pollution condition.
After 17:00 LST, the positive value begins to decrease significantly. A small range of positive turbulent moisture flux is predicted on the eastern side of the mountain from 03:00 to 06:00 LST on the next day since the leeward wind conveys the dry air from a higher altitude to the bottom of the mountain.
Figure 15 presents the turbulent momentum flux of U-component. Compared to the more uniformly distributed turbulent heat and moisture fluxes, the turbulent momentum flux shows more complexity around the mountain area. Doran et al. [
15] considered that it is because turbulent momentum flux, which depends on both vertical and horizontal fluctuations, is more complicated than turbulent heat and moisture fluxes, which depend mainly on vertical fluctuations.
A positive value within the convective boundary layer is predicted after 09:00 LST in the morning, indicating a momentum exchange between the boundary layer and the free atmosphere. In other words, perturbed westerly flows near the surface are propagated upwards, and the perturbed easterly flows in the free atmosphere are propagated downwards, under the impact of a turbulent motion. As shown in
Figure 15b, the positive value is enhanced near the western slope, and a well-defined negative flux presents on the eastern slope. This flux pattern favors the maintenance of the plain breeze circulation, replenishing the momentum for the convergent upward flows. Later, when the surface heating weakens, this pattern subsequently collapses, causing the attenuation of the plain breeze circulation in the late afternoon. From 03:00 to 06:00 LST of the next day, a small range of positive turbulent momentum flux exists on the eastern slope in the nighttime, which means perturbed easterly flows are transported downwards and are accounted for the short duration and the weak strength of the nocturnal leeward breeze circulation.
The maximum turbulent momentum flux curve in
Figure 15d presents larger values on the first day. This is partly due to the larger U-component in the free atmosphere, which results in stronger turbulent momentum exchange. Moreover, it is interesting that the maximum value increases again after 21:00 LST on the first day, with the higher height of the maximum value compared to the second day. This can be clearly seen in the turbulent heat and moisture curves. In the vertical cross-section of TKE (not shown), high TKE values can be found both above the mountain top and on the eastern slope at time corresponding with the strong vertically propagating mountain waves appears. Jackson et al. [
37] reviewed past research regarding the dynamically-driven mountain waves, and showed that turbulences are easily generated in the breaking wave region and hydraulic jump region of the vertically propagating waves. This helps confirm and explain the existence of a large turbulent flux value and why it maintains at the upper level at night. It is worth mentioning that the turbulence above the mountain top, and on the downstream area might cause hazards when it reaches certain intensities. Also, downstream mountain wave rotors may kick up the dust on the surface, which could account for the poor air quality in Jianyang. Since this phenomenon does not show up on the second day, it is convinced that the vertically propagating mountain wave shows a strong dependence on synoptic conditions.