Evapotranspiration in Northern Agro-Ecosystems: Numerical Simulation and Experimental Comparison

2.1. Field experiment

The field study was conducted at the Fairbanks Experiment Farm (FEF) of the University of Alaska Fairbanks (UAF) Agricultural and Forestry Experiment Station (AFES) Fairbanks Alaska (Figure 1), USA (64°51′16.6″ N, 147°51′36.4″ W, 150 m above sea level) during summer 2013. The soil within the lysimeter plots, established in a previous study, was used for this study because large amounts of data (i.e., soil moisture, soil temperature, and soil moisture potential) were available. The soil composition was sandy loam with 66 sand, 29 silt, and 5% clay, and with the available water holding capacity of about 0.18–0.36 m³ m⁻³ that was determined from a soil moisture characteristic curve [24]. Parameters for soil hydraulic properties to be introduced in the numerical simulation are listed in Table 1. Volumetric soil moisture content was measured in situ using three soil moisture sensor (10HS; Decagon Devices Inc., Pullman, WA, USA) at 5, 10, and 20 cm. The sensor has 14.5 cm long prongs, 3.3 cm wide, so the 5-cm sensor spanned the depth 3.3–6.7 cm, the 10-cm sensor spanned the depth 8.3–11.3 cm, and the 20-cm sensor spanned the depth 18.3–21.3 cm. Gravimetric samples were also taken to calibrate the 10HS sensor [24]. Soil moisture was continuously measured with an interval of 30 min. The bulk density was measured in the tested site (Table 1). The soil temperature (S-TMB-M006, Onset HOBO Corporation, Bourne, MA, USA) was measured at depths of 5, 10, and 20 cm below the soil surface and used to obtain the ground heat flux in this study.

The observation-based meteorological parameters included air temperature (Tair), relative humidity (RH), air pressure, wind speed (u), and direction, and precipitation at 2 m height above the ground were obtained at 1-min intervals at the experimental station. One-min recordings of these data were averaged to obtain hourly data for input to the simulation.

An independent measure of evapotranspiration was determined using Penman-Monteith method and the more continuous series of data available on this period. Sensible heat flux was measured locally (i.e., ecosystem scale) by means of and eddy-covariance (EC) instrument and processed considering signal distortions under all weather conditions [27] and, at landscape scale, based on a large aperture scintillometer (LAS) [28–30].

2.2. Model implementation

2.2.1. Model description (PSP_coupled)

The numerical model was coded in Python and is set in a time-evolving one-dimensional simulation of coupled flow of liquid water, heat, and water vapor. The model description can be found in Bittelli et al. [26, 31]. Figure 2 shows the models’ conceptual scheme indicating the coupled layers and driving boundary conditions, i.e., soil temperature, liquid water volumetric concentration, and soil resistive and conductive terms. The model computes the soil energy budget. The PSP-coupled model is composed of ten modules with two input data files and one main program file. One data file contains the soil data, and the other one contains the weather data. Model modules include main.py, PSP_boundary.py, PSP_public.py, PSP_soil.py, PSP_coupled1D.py, PSP_readDataFile.py, PSP_longWaveRadiation.py, PSP_grid.py, PSP_plot.py, PSP_plotEnergy.py, PSP_ThomasAlgoritmh.py, soil.txt, and Weather.txt.

The main file is main.py, which contains the calls to other embedded subroutines listed. The module PSP_boundary defines the initial and boundary conditions. The PSP_public contains all variables that are read by all modules such as latitude, longitude, altitude, albedo, atmospheric pressure and clay content, initial soil temperature, and soil matric potential. The PSP_soil is written to define the soil properties. The PSP_couple1D is the module that implements the solver for the different flux equations. The PSP_longWaveRadiation is for computing the long wave radiation component of the radiation balance at the soil surface. The PSP_grid module is for building the computational grid and PSP_ThomasAlgorithm for solving the system of equations. The PSP_plot and PSP_plotEnergy are modules for visualizing the data input and output from the model.

3.1. Dry period

The experimental data were taken from the plots that monitored soil moisture and soil temperature. The meteorological parameters measured about 10 m away from the plot for the dry period are given in Table 3 and Figure 3a. The hourly average vapor pressure deficit (VPD) was 1.18 kPa. Mean-hourly global radiation was 215 W m⁻². The average air temperature was 21°C with maximum of 30.7°C and minimum of 9.8°C also reported in this period. The average RH was approximately 58% and wind speed of 2.36 m s⁻¹.

3.2. Wet period

The meteorological conditions during the wet period 18–30 August 2013 (Julian 230–242) was cooler than the dry period in terms of an average hourly air temperature and soil temperature (Figure 3b), while there was a slight difference in solar radiation compared to the dry period (see Table 3). The RH was approximately 77% with low level of VPD (0.36 kPa) on average during the wet period (Table 3). A total precipitation of 37.60 mm was also reported in this period. However, only data during 25–30 August 2013 (Julian 237–242) are used as the wet period for the simulation in this study.

4.1. Net radiation

Net radiation (R_net) is the main input in the energy balance equation driving evapotranspiration process. Giving this importance, a comparison between the net radiation observed (R_net obs) and modeled (R_net mod) was performed. Figure 4a shows simulated and measured hourly data of net radiation as a function of time for the dry period (26 July–3 August 2013). Results show a good agreement between modeled and observed R_net with the correlation coefficient (R²) of 0.92 and root mean square error (RMSE) of 45 W m⁻² (Figure 5a) during the dry period. There are about 6 days out of nine total days that the model performed remarkably well to simulate the R_net and the maximum difference did not exceeded 157 W m⁻² on 27 July (Julian day 208).

Overall, R_net mod overestimated R_net obs by about 16%. Similar results have been reported by Ortega-Farias et al. [36] in a commercial vineyard where the R_net simulation shows a good agreement with the measured R_net (R² = 0.92) with the RMSE less than 48 W m⁻². On the other hand, a lower correlation between R_net obs and R_net mod was found during the wet period with the R² of 0.72 and RMSE of 67 W m⁻² (Figure 5b). However, there were two days from 25 to 26 August that the model simulated very well compared with the measured R_net, while it was underestimated in the following 2 days (27–28 August) and overestimated in the last 2 days during the wet period (Figure 4b). The maximum underestimation for the entire time series was about 85 W m⁻², and the maximum overestimate was 199 W m⁻².

The high and low correlation between measured and modeled R_net in different periods can be related to the cloudiness variability in high latitudes. This may be explained based on the variability of incoming solar radiation between those periods as we can see in Figure 6. An average of solar radiation of 215 W m⁻² with the maximum and minimum of 680, 150 W m⁻² respectively were reported in the dry period, while a lower mean and maximum R_net were found in the wet period (Table 3). Ortega-Farias et al. [37] indicated that errors in the calculation of R_net over a well-irrigated festuca grass were associated with the estimation of atmospheric radiation under cloudy sky conditions. Therefore, to summarize this point, R_net mod was able to estimate net radiation with a good degree of precision during the dry period than during the wet period.

4.2. Latent heat

Figure 7 shows simulated and observed latent heat flux (LE) as a function of time during dry and wet periods. High rates of solar radiation heating the soil surface caused the soil to lose water vapor to evaporation from the surface. During nighttime, there was negative conduction to cool the soil surface, and LE became negative due to condensation. The LE was better predicted by the numerical model during the dry period, with an R² of 0.70 and RMSE of 53 W m⁻² than the wet period (R² = 63 and RMSE = 58 W m⁻²). There were 2 days that the model overestimated LE, but the time series followed each other, while 1 day obtained similar values and 3 days of modeled LE did not correlate with the observed LE. The maximum difference between observed and simulated LE was about 200 W m⁻². Cumulative ET from the observed quantities reached 22 mm with an average of 2.44 mm d⁻¹, while cumulative ET from the vsimulation was 15 mm with the mean of 1.67 mm d⁻¹ for the dry period. In contrast, during the wet period, the cumulative ET from the observed was about 6 mm over 6 days, whereas only about 2 mm was found from the simulation of ET cycles. An average precipitation observed was 1.0 mm d⁻¹, while only 0.3 mm d⁻¹ was found for the simulation during the wet period.

4.3. Ground heat fluxes

The average daytime ground heat flux (G) contribution to vapor flux was in the order of 26 W m⁻² (ranging from 1 to 79 W m⁻²), while the value output from the simulation was on average 25 W m⁻² (ranging from 0.8 to 49 W m⁻²; Figure 8). In Figure 8a, modeled G resulted as overestimated for the first two days, and then closely approached the G observed at day 3, and underestimated the observations during the last 2 days of the dry period. The maximum reported difference was 44 W m⁻² during the overestimating period, whereas the same values were 32 W m⁻² found during the underestimating period. On the contrary, the simulation of G during the wet period was overestimated for the entire period (Figure 8b) with the maximum difference of more than 100 W m⁻² during daytime.

4.4. Sensible heat

The sensible heat (H) fluxes obtained from measurements and from the simulation for agricultural field were compared during the dry and wet period. The time series composite of hourly diurnal variation during dry and wet was illustrated in Figure 9. In the dry period, results showed a good correlation between H measured by EC and simulated from models with R² = 0.63 and RMSE = 32 W m⁻², whereas a lower correlation was found in H observed by LAS (R² of 0.52 and RMSE of 40 W m⁻²) (Figure 9a). Nevertheless, LAS measurements represent a larger fluxing footprint area than EC-derived fluxes, and the simulations output converge well between these two scale-dependent observations. Overall simulated outputs overestimated H from EC except in the morning where they were closer in value. The ratio of H by EC and simulated was about 0.47, while ratio of H modeled versus H by LAS was 0.82. The maximum of H from model, EC, and LAS were 139, 110 and 169 W m⁻², respectively, during midday.

Concerning the wet period, very poor correlation was found between H measured by LAS and simulated outputs for H (R² = 0.15, RMSE =13 W m⁻²). It should be noted that H by EC was not illustrated during this period because of insufficient data for the analysis. The time-series composite of hourly diurnal variation of H from both methods are illustrated in Figure 9b. Mean hourly H observed was 30 W m⁻², while only 15 W m⁻² was reported from modeled H. In general, H showed higher values than H simulated by about 51% with the maximum difference of 36 W m⁻² during the wet period.

4.5. Soil temperature and soil moisture

Soil temperature was measured at the same depth as soil moisture. Figure 10 shows simulated and observed soil temperature as a function of time during dry and wet periods. During the dry period, the value of soil temperature from experiment reached 17°C and was higher than the simulated 11°C for the same depth at the beginning of the simulation period. However, after midday in the first day, the simulated value was higher than observed soil temperature over entire dry period (Figure 10a). The soil temperature was better predicted by the numerical model during the wet period, with an R² of 0.59 and RMSE of 1.82°C than the dry period (R² = 0.47 and RMSE = 3.27°C). The maximum difference between observed and simulated soil temperature was about 8°C during mid of the day in dry period and the times series followed each other. There was only a day that the model underestimated in a wet period, while most of the time, simulated values overestimated the observed data (Figure 10b). A large difference of the soil temperature can cause differences in the land-atmosphere temperature gradient that affect the ground heat flux as described in the previous sections. However, in this case, we found the model in good agreement in predicting soil temperatures for this environment.

The soil moisture was measured in the plot at three depths. From the measurements, we found that the high moisture content was in the lower depth than in the surface layer. The initial soil moisture during the dry period above the soil surface was about 0.28 m³ m⁻³ (5 cm depth). The numerical model gave a lower level soil moisture around the same depth with a large difference of 0.21 m³ m⁻³ when compared to the observed data. Some disagreement between modeled and observed data was also found during the wet period where the measurement of soil moisture from the plot was 0.30 m³ m⁻³ for the first day; however, the simulation gave a lower value of soil moisture with a difference larger than 0.13 m³ m⁻³. In addition, an underestimation of simulated soil moisture potential is also reported in this study during both periods. This could be due to the lack of representation on the hydraulic properties of the soils especially for the subarctic soil. This is important because the hydraulic conductivity versus the soil moisture potential curve is highly nonlinear and, therefore, the flow of soil moisture from the upper layer to the lower layer in a wet period leads to a large decrease in hydraulic conductivity and liquid water distribution [26, 31], while during the dry period, the soil moisture was more constant along the depths with less dependence on the liquid fraction. The soil moisture content fluctuated through the day according to the vapor flux as reported previously [38–40]. As such, improvements in the model’s representation of both soil moisture and soil moisture potential in order to have an optimal simulation output. There is also a need to further study the vertical soil properties along the soil depth under agricultural land in subarctic region. Evaluation of simulation performance for subarctic soil and weather seems that more parameters might be needed to improve model simulation because of influence of the permafrost, soil properties across landscape and weather variability.