In this study, 30 different undisturbed soil samples were collected from surface and subsurface layers of different soil profiles from Moscow region (56° 08′ N, 037° 48′ E), Russia. Three soil profiles were dugout and then divided into three horizons for each profile, horizon A (0-30) cm, horizon EL (30-40) cm and horizon B1 (40-50) cm. Then, undisturbed soil samples were collected according to the difference in the depth from each horizon. Standard 100 cm³ (a 5 cm diameter) sampling rings were used in the analysis. Silty loam and silty clay loam soils represented major agricultural in agro-podzolic soils of the Moscow region, Zelenograd field laboratory of Soil Science, Institute named V.V.Dokuchaev. International soil science system of soil texture classification was used to define soil texture. Soil texture was silty loam in horizon A for surface layers and silty clay loam in horizon B1 for subsurface layers. Soil thermal diffusivity was measured at different water content (7 levels for each sample), N=210 replicates.

Particle Size Distribution (PSD) was measured using the pipette method based on stock law. Sodium pyrophosphate solution 4% was used as a dispersing agent as described by Gee and Bauder [21]. International Data Based: Sand > 0.05 mm, Silt (0.002-0.05) mm and Clay <0.002 mm. Soil bulk density (ρ_b) was determined by the volumetric cylinder method Klute and Dirksen [22]. The soil samples were initially sieved through the 2 mm sieve before PSD and OM determination (Fig. 1).

Fig. (1). Box plots of selected soil physical properties including particle size distribution, soil bulk density (g/cm3) and organic matter %.

Soil thermal diffusivity was measured in the laboratory using Kondratieff method [12] at different water content according to Shein and Mady [5]. The levels of soil water content were 0.14, 0.16, 0.18, 0.22, 0.25, 0.28 and 0.30 g/g soil.

One method for measuring thermal diffusivity is based on placing a heat source, having a constant temperature in contact with the surface of a soil column having constant cross-sectional area and insulated sides, then measuring soil temperature every 15 sec for 30 min.

K_D is the soil thermal diffusivity m²/s, α is the heating or cooling rate of the soil (second^-1) and β is the constant which depends on the shape and volume of the soil in core.

The relationship between soil thermal diffusivity and water content was represented using a quadratic equation as Eq.2 Shein and Mady [5]. The quadratic equation, one of the nonlinear regression forms, was selected according to the highest value of determination coefficient (R²) between soil thermal diffusivity and water content.

(2)

Where, b₁, b_2, and b_3, were the experimental parameters depended on soil physical properties and ɷ was the weight of soil water content.

The parameters of the quadratic equation (b₁, b₂, b₃) were estimated by fitting curve using MATLAB program. PTFs models were developed using the exponential equation for predicting parameters of quadratic equation (b₁, b₂, and b₃) based on fundamental of soil physical properties. Soil physical properties used as independent variables were the percentage of sand, silt, clay, soil bulk density, and organic matter. Soil samples were divided into training data and testing data. Twenty soil samples (140 replicates) used as the training dataset to determine and propose PTF, and ten soil samples (70 replicates) used as the testing dataset in order to evaluate the efficiency of this PTF. Table 1 showed that three different classes of PTFs (K_DPTF-1 to K_DPTF-3) were proposed to calculate thermal diffusivity as a function of water content based on soil physical properties.

The parameters of the quadratic equation b₁, b₂ and b₃ were calculated as a function of soil physical properties using PTFs (exponential equations). All suggested PTFs give K_D in [m²/s], and the following equations were suggested as (Table 2).

The efficiency of the Pedotransfer Functions (PTFs) was determined using Root Mean Square Error (RMSE) and Geometric Mean Error Ratio (GMER) expressed as:

Where, Y_i denotes the measured value, refers to the predicted value, represents the average of the measured value of Y and N is the total number of observations.

Geometric Mean Error Ratio (GMER) was calculated from the error ratio (r_k) of measured soil thermal diffusivity (KD) _m versus predicted soil thermal diffusivity (KD) _p values:

The GMER equals to 1 which corresponds to an exact matching between measured and predicted soil thermal diffusivity; the GMER<1 indicates that the predicted values were generally underestimated; GMER>1 points to overestimation.

Software tools used for statistical analyses were Microsoft Excel 2007, MADLAB and SPSS (version 16.0) (IBM SPSS Statistics, Armonk, NY).

Variation of the soil thermal diffusivity as a function of soil water content is shown in Fig. (2). The soil thermal diffusivity values were varied from 1.40×10⁻⁷ to 2.56×10⁻⁷ m²/s for silty clay loam and silty loam soils, the range of soil water content was 0.14 to 0.30 g/g. The mean value of soil thermal diffusivity was 1.52×10⁻⁷ m²/s for silty clay loam in the subsurface layer (40-50) cm as Figs. (2e, j), while it was 2.05×10⁻⁷ m²/s for silty loam soil in the top surface layer (0-10) cm as Figs. (2a, f). In general, higher soil thermal diffusivity values were at the top surface than at subsurface layers. This result agreed with Danelichen et al. [23]; they showed that the average of thermal diffusivity was 1.95×10^-7 m²/s in the top layer (0.01-0.15 m) and was 1.02×10^-7 m²/s in the subsurface layer (0.01-0.30 m). Soil thermal diffusivity at first increased rapidly with increasing water content to reach the maximum at soil moisture (23-28 g/g), then decreased at a slower rate. The reason of that water content increased thermal contact between soil particles and replaced the air (which has lower thermal conductivity than water) increasing the specific heat between soil partials. While soil thermal diffusivity increased more rapidly than the volumetric heat capacity decreasing thermal diffusivity. This result was in agreement with Usowicz et al. [24]; Arkhangel’skaya et al. [25]; they found that soil thermal diffusivity (K_D) is amplified by increasing the soil bulk density and moisture content. And also with depth, soil bulk density was increased and soil organic matter was decreased, which affected soil porosity, pore size distribution, volumetric of heat capacity and decreased the soil thermal diffusivity according to Shein and Mady [5].

Soil thermal diffusivity was measured at different water content. It was represented by ∩ shaped curve using a quadratic equation as Eq. (2)

(2)

Where, b₁, b_2, and b_3, were the experimental parameters those were estimated by 3 proposed PTFs based on soil physical properties, in order to estimate soil thermal diffusivity at different water content, and ɷ was the weight water content.

Fig. (2). The relationship between soil thermal diffusivity and water content for different soil depths and soil texture.

In the case of K_DPTF-1, the parameters of the quadratic equation were more accurate than K_DPTF-3 and that in the case K_DPTF-2, respectively. The results of statistical comparison between developed PTFs classes by NLR are presented in Table 3. The smallest value of GMER close to 1 was 1.05 for K_DPTF-1, which showed a small overestimation, while the largest GMER value was 1.15 for K_DPTF-2, which showed a big overestimation. Also, the smallest value of RMSE was 2.94×10^-8 m²/s for K_DPTF-1, while the largest value of RMSE was 3.82×10^-8 m²/s for K_DPTF-2. The best class of PTFs developed by NLR was K_DPTF-1 (RMSE=2.94×10^-8 m²/s, and GMER =1.05), which took into account the percentage of sand, silt, and clay (soil texture). While the worst PTFs class developed by NLR was K_DPTF-2(RMSE = 3.82×10^-8 m²/s, and GMER =1.15), which considered the percentage of sand, silt clay, and soil bulk density. RMSE for K_DPTF-2 was 1.3 times larger than for K_DPTF -1, while it was 1.1 times for K_DPTF-3. Table 3 showed that the best PTFs classes developed by NLR were K_DPTF-1, K_DPTF-3, and K_DPTF-2 according to the smallest values of RMSE (which were 2.94×10^-8, 3.52×10^-8, and 3.82×10^-8 m²/s, respectively), and according to the GMER close values to 1 (which had the perfect values) as illustrated in Table 3. Box plots in Fig. (3) showed that the difference between measured K_D and calculated K_DPTF-1 was lower than the difference between measured K_D and both of the calculated K_DPTF-3 and K_DPTF-2, respectively. Moreover, the mean difference between measured K_D and calculated K_DPTF -1 was closest to the zero. These results were in agreement with the mentioned results of the statistical analysis. Also, the parameters of quadratic equation (b₁,b₂, and b₃) were calculated by K_DPTFs-1, considering that the soil texture was more accurate than K_DPTFs-3, which further considered that soil texture, bulk density, and organic matter, were more accurate than K_DPTFs-2, considering soil texture, and bulk density. This result was in agreement with the HYDRUS-1D program [17], which was used for estimating thermal conductivity and thermal regime using the model of Chung and Horton [16] and the parameters of the model were estimated using only soil texture [17]. Also, Mady and Shein [26] found that the soils which have the same texture, have same soil physical characteristics. Moreover, Ghader [20], studied the effect of the bulk density on increasing the thermal properties of clay‒loam soil which was more than that of moisture content. Those results ensured the impact of soil texture on the soil thermal diffusivity and parameters of the quadratic equation were more than bulk density.

Fig. (3). The difference between measured KD and calculated KD PTF-1, KD PTF-2, KD PTF-3 proposed by PTFs.

For the validation of quadratic equation, the relation between soil thermal diffusivity and water content was represented by ∩ shaped curve. It appears to be more logical because with increasing soil moisture, increasing contact points between the soil particles lead to increasing soil bulk density and thermal diffusivity reaching the maximum values of thermal diffusivity at soil field capacity. With more soil moisture, soil particles have less cohesion with water consequently resulting in decreasing soil thermal diffusivity [5, 13].

Also, Ghader 20 estimated soil thermal diffusivity as a function of soil bulk density and soil moisture using quadratic equation. Quadratic equation and exponential equation represent nonlinear regression which are usually used for developing PTFs using statistical regression [27, 28]. On the other hand, no significant difference found between three developed models used for estimating the parameters of the quadratic equation and thermal diffusivity at different values of water content. The correlation coefficient (r) between the parameters of the quadratic equation (b₁, b₂, and b₃) and each of the sand, silt, clay fractions represented as PSD, bulk density, and organic matter is shown in Table 4. It appeared that no correlation found between parameters of the quadratic equations b₁, b₂ and b₃ and soil physical properties. While the parameters of the quadratic equation based only on water content, as well as on the rate of increasing or decreasing soil moisture with soil thermal diffusivity.

Measurements of the soil thermal diffusivity are required for modeling soil heat flux and temperature regime. Those measurements consume both time and money. So it is important to estimate soil thermal diffusivity based on easily available data such as soil moisture, bulk density and soil texture using mathematical models and PTFs.