برآورد مکانی اندوخته کربن روی زمین جنگلهای بلوط زاگرس با استفاده از رگرسیون کریجینگ، رگرسیون وزندار جغرافیایی کریجینگ و تصاویر لندست 8
الموضوعات :
سمیه ایزدی
1
,
هرمز سهرابی
2
1 - دانش آموخته دکتری، دانشکده منابع طبیعی و علوم دریایی، دانشگاه تربیت مدرس، تهران، ایران.
2 - دانشیار، دانشکده منابع طبیعی و علوم دریایی، دانشگاه تربیت مدرس، تهران، ایران. *(مسوول مکاتبات)
تاريخ الإرسال : 16 الأربعاء , ربيع الأول, 1441
تاريخ التأكيد : 16 السبت , جمادى الأولى, 1441
تاريخ الإصدار : 21 الأحد , شوال, 1443
الکلمات المفتاحية:
تغییرات مکانی,
دادههای طیفی,
ناهمگنی مکانی,
زمینآمار,
مدلسازی مکانی,
ملخص المقالة :
زمینه و هدف: برآورد اندوخته کربن روی زمین برای مدیریت پایدار و اصولی جنگل ضروری است؛ از این رو انتخاب روش مناسب برای برآورد اندوخته کربن روی زمین جنگل اهمیت ویژهای دارد. متداول ترین روش برآورد، مدل های رگرسیون خطی است که با استفاده از داده کمکی کم هزینه، متغیر هدف را در مناطق وسیع برآورد می کند. مدل های اولیه رگرسیون به دلیل ثابت بودن ضرایب رگرسیون در تمام نقاط، ناهمگنی و ساختار مکانی را در مدل سازی لحاظ نمی کنند. هدف مطالعه حاضر برآورد اندوخته کربن روی زمین جنگل با استفاده از رگرسیون کریجینگ و رگرسیون وزن دار جغرافیایی کریجینگ و اطلاعات مستخرج از تصاویر لندست 8 و مقایسه روش ها است.
روش بررسی: مطالعه در بخشی از جنگل های زاگرس در استان کهگیلویه و بویراحمد انجام گرفت. در مجموع 184 قطعه نمونه زمینی (30 متر در 30 متر) برداشت و با استفاده از روابط آلومتریک مقدار کربن روی زمین نمونه ها محاسبه شد. در روند مدل سازی از تصاویر لندست 8 به عنوان داده کمکی استفاده شد. معیارهای ضریب تبیین، مجذور میانگین مربعات خطا جهت ارزیابی روش ها استفاده شد.
یافته ها: نتایج نشان داد روش رگرسیون وزن دار جغرافیایی کریجینگ (21 RMSE = و 66/0 = R2) در مقایسه با رگرسیون کریجینگ (28 RMSE = و 49/0 = R2) در برآورد اندوخته کربن روی زمین جنگل عملکرد مناسبی دارد. این روش می تواند جایگزین مناسبی برای روش های اولیه از جمله رگرسیون خطی باشد.
بحث و نتیجه گیری: روش های ترکیبی با در نظر گرفتن ناهمگنی و همبستگی مکانی می تواند جایگزین مناسبی برای روش های اولیه رگرسیونی با هدف برآورد اندوخته کربن روی زمین جنگل باشند.
المصادر:
Backéus, S., Wikström, P., Lämås, T., 2005. A model for regional analysis of carbon sequestration and timber production, Forest Ecology and Managenment, Vol. 216, pp. 28–40.
Azizi, Z., Hosseini, A., Iranmanesh , Y., 2015. Estimating Biomass of Single Oak Trees Using Terrestrial Photogrammetry, Journal of Environmental Science and Technology, Vol. 19, pp. 82–93.
Safari, A., Sohrabi, H., Powell, S., Shataee, S., 2017. A comparative assessment of multi-temporal Landsat 8 and machine learning algorithms for estimating aboveground carbon stock in coppice oak forests, International Journal Remote Sensing, Vol. 38, pp. 6407–32.
Bishop, T.F.A., Mcbratney, A.B., 2006. A comparison of prediction methods for the creation of field-extent soil property maps, Geoderma, Vol. 103, pp. 149-160.
Lu, D., 2006. The potential and challenge of remote sensing-based biomass estimation, International Journal of Remote Sensing, Vol. 27, pp. 1297–328.
6. Meng, Q., Cieszewski, C., Madden, M., 2009. Large area forest inventory using Landsat ETM+: A geostatistical approach, ISPRS Journal Photogrammetry and Remote Sensing, Vol. 64, pp. 27–36.
Viana, H., Aranha, J., Lopes, D., Cohen, W.B., 2011. Estimation of crown biomass of Pinus pinaster stands and shrubland above-ground biomass using forest inventory data , remotely sensed imagery and spatial prediction models, Ecological Modelling, Vol. 226, pp. 22–35.
Li, W., Niu, Z., Liang, X., Li, Z., Huang, N., Gao, S., Wang, Ch., Muhammad, Sh., 2015. Geostatistical modeling using LiDAR-derived prior knowledge with SPOT-6 data to estimate temperate forest canopy cover and above-ground biomass via stratified random sampling, International Journal of Applied Earth Observation and Geoinformation, Vol. 41, pp. 88–98.
Sinha, S., Jeganathan, C., Sharma, L.K., Nathawat, M.S., 2015. A review of radar remote sensing for biomass estimation, International Journal of Environmental Science and Technology, Vol. 12, pp. 1779–92.
Karl, J.W., 2010. Spatial Predictions of Cover Attributes of Rangeland Ecosystems Using Regression Kriging and Remote Sensing. Rangeland Ecology and Managenment, Vol. 63, pp. 335–49.
11. Hengl, T., Heuvelink, G.B.M., Rossiter, D.G., 2007. About regression-kriging: From equations to case studies. Computers & Geoscience, Vol. 33, pp. 1301–15.
Ahadi, Z., Alavi, S.J., Hoseini, S.M., 2017. Beech forest site productivity mapping using ordinary kriging and IDW (Case study: research forest of Tarbiat Modares University), Iranian Journal of Forest and Wood Product, Vol. 70, pp. 93-102. (In Persian)
Fayad, I., Baghdadi, N., Bailly, J., Barbier, N., Gond, V., Hajj, M. E.l., 2016. Supplementary Materials : Regional Scale Rain-Forest Height Mapping Using Regression-Kriging of Spaceborne and Airborne LiDAR Data : Application on French Guiana, Remote Sensing, Vol. 8, pp. 1–5.
Wu, C., Shen, H., Shen, A., Deng, J., Gan, M., Zhu, J., Xu, H, Wang, K., 2016. Comparison of machine-learning methods for above-ground biomass estimation based on Landsat imagery. Journal of Applied Remote Sensing, Vol. 10, pp. 035010-17.
Gao, Y., Lu, D., Li, G., Wang, G., Chen, Q., Liu, L., Li, D., 2018. Comparative analysis of modeling algorithms for forest aboveground biomass estimation in a subtropical region, Remote Sensing, Vol. 10, pp. 1-22.
Kumar, S., Lal, R., Liu, D., 2012. A geographically weighted regression kriging approach for mapping soil organic carbon stock, Geoderma, Vol. 189, pp. 627–34.
Lloyd, C.D., 2010. Nonstationary models for exploring and mapping monthly precipitation in the United Kingdom, Internation Journal of Climatology, Vol. 30, pp. 390–405.
Propastin, P., 2010. Multiscale analysis of the relationship between topography and aboveground biomass in the tropical rainforests of Sulawesi, Indonesia, International Journal of Geographical Information Science, Vol. 25, pp. 455-472.
Propastin, P., 2012. Modifying geographically weighted regression for estimating aboveground biomass in tropical rainforests by multispectral remote sensing data. International Journal of Applied Earth Observation and Geoinformation, Vol. 18, pp. 82–90.
Van der Laan, C., Verweij, P.A., Quiñones, M.J., Faaij, A.P.C., 2014. Analysis of biophysical and anthropogenic variables and their relation to the regional spatial variation of aboveground biomass illustrated for North and East Kalimantan, Borneo, Carbon Balance and Management, Vol. 9, pp. 2-12.
Chen, L., Ren, C., Zhang, B., Wang, Z., Xi, Y., 2018. Estimation of Forest Above-Ground Biomass by Geographically Weighted Regression and Machine Learning with Sentinel Imagery, Forests, Vol. 9, pp. 1–20.
Brunsdon, C., Fotheringham, A.S., Charlton, M.E., 1996. Geographically Weighted Regression, Geographical Analysis, Vol. 28, pp. 281-298.
Kupfer, J.A., Farris, C.A. 2007. Incorporating spatial non-stationarity of regression coefficients into predictive vegetation models, Landsc Ecology, Vol. 22, pp. 837–52.
Harris, P., Fotheringham, A.S., Crespo, R., Charlton, M., 2010. The Use of Geographically Weighted Regression for Spatial Prediction: An Evaluation of Models Using Simulated Data Sets, Math Geoscience, Vol, 42, pp. 657–80.
Wang, K., Zhang, C., Li, W., 2012. Comparison of geographically weighted regression and regression kriging for estimating the spatial distribution of soil organic matter, GIScience Remote Sensing, Vol. 49, pp. 915–32.
Liu, Y., Guo, L., Jiang, Q., Zhang, H., Chen, Y., 2015. Comparing geospatial techniques to predict SOC stocks, Soil & Tillage Research, Vol. 148, pp. 46–58.
Sohrabi, H., Shirvani, A., 2012. Allometric equations for estimating standing biomass of Atlantic Pistache (Pistacia atlantica var. mutica) in khojir National Park. Iranian Journal of Forest, Vol. 4, pp. 55-64. (In Persian)
Iranmanesh, Y., Sagheb Talebi, Kh., Sohrabi, H., Jalali, S.GH., Hosseini, S.M., 2014. Biomass and carbon Stocks of Brants oak (Quercus brantii Lindl.) in two vegetation forms in Lordegan, Chaharnahal & Bakhtiari Forests. Iranian Journal of Forest and Research, Vol. 22, pp. 762-749. (In Persian)
Yang, S.H., Liu, F., Song, X.D., Lu, Y.Y., Li, D.C., Zhao, Y.G., Zhang, G.L., 2019. Mapping topsoil electrical conductivity by a mixed geographically weighted regression kriging: A case study in the Heihe River Basin, northwest China. Ecological Indicator, Vol. 102, pp. 252–64.
Kang, D., Dall’erba, S., 2016. Exploring the spatially varying innovation capacity of the US counties in the framework of Griliches’ knowledge production function: a mixed GWR approach, Journal of Geographical Systems, Vol, 18, pp. 125–157.
Mishra, U., 2010. Predicting the Spatial Variation of the Soil Organic Carbon Pool at a Regional Scale, Soil & Water management & Conservation, Vol. 74, pp. 906-914.
_||_
Backéus, S., Wikström, P., Lämås, T., 2005. A model for regional analysis of carbon sequestration and timber production, Forest Ecology and Managenment, Vol. 216, pp. 28–40.
Azizi, Z., Hosseini, A., Iranmanesh , Y., 2015. Estimating Biomass of Single Oak Trees Using Terrestrial Photogrammetry, Journal of Environmental Science and Technology, Vol. 19, pp. 82–93.
Safari, A., Sohrabi, H., Powell, S., Shataee, S., 2017. A comparative assessment of multi-temporal Landsat 8 and machine learning algorithms for estimating aboveground carbon stock in coppice oak forests, International Journal Remote Sensing, Vol. 38, pp. 6407–32.
Bishop, T.F.A., Mcbratney, A.B., 2006. A comparison of prediction methods for the creation of field-extent soil property maps, Geoderma, Vol. 103, pp. 149-160.
Lu, D., 2006. The potential and challenge of remote sensing-based biomass estimation, International Journal of Remote Sensing, Vol. 27, pp. 1297–328.
6. Meng, Q., Cieszewski, C., Madden, M., 2009. Large area forest inventory using Landsat ETM+: A geostatistical approach, ISPRS Journal Photogrammetry and Remote Sensing, Vol. 64, pp. 27–36.
Viana, H., Aranha, J., Lopes, D., Cohen, W.B., 2011. Estimation of crown biomass of Pinus pinaster stands and shrubland above-ground biomass using forest inventory data , remotely sensed imagery and spatial prediction models, Ecological Modelling, Vol. 226, pp. 22–35.
Li, W., Niu, Z., Liang, X., Li, Z., Huang, N., Gao, S., Wang, Ch., Muhammad, Sh., 2015. Geostatistical modeling using LiDAR-derived prior knowledge with SPOT-6 data to estimate temperate forest canopy cover and above-ground biomass via stratified random sampling, International Journal of Applied Earth Observation and Geoinformation, Vol. 41, pp. 88–98.
Sinha, S., Jeganathan, C., Sharma, L.K., Nathawat, M.S., 2015. A review of radar remote sensing for biomass estimation, International Journal of Environmental Science and Technology, Vol. 12, pp. 1779–92.
Karl, J.W., 2010. Spatial Predictions of Cover Attributes of Rangeland Ecosystems Using Regression Kriging and Remote Sensing. Rangeland Ecology and Managenment, Vol. 63, pp. 335–49.
11. Hengl, T., Heuvelink, G.B.M., Rossiter, D.G., 2007. About regression-kriging: From equations to case studies. Computers & Geoscience, Vol. 33, pp. 1301–15.
Ahadi, Z., Alavi, S.J., Hoseini, S.M., 2017. Beech forest site productivity mapping using ordinary kriging and IDW (Case study: research forest of Tarbiat Modares University), Iranian Journal of Forest and Wood Product, Vol. 70, pp. 93-102. (In Persian)
Fayad, I., Baghdadi, N., Bailly, J., Barbier, N., Gond, V., Hajj, M. E.l., 2016. Supplementary Materials : Regional Scale Rain-Forest Height Mapping Using Regression-Kriging of Spaceborne and Airborne LiDAR Data : Application on French Guiana, Remote Sensing, Vol. 8, pp. 1–5.
Wu, C., Shen, H., Shen, A., Deng, J., Gan, M., Zhu, J., Xu, H, Wang, K., 2016. Comparison of machine-learning methods for above-ground biomass estimation based on Landsat imagery. Journal of Applied Remote Sensing, Vol. 10, pp. 035010-17.
Gao, Y., Lu, D., Li, G., Wang, G., Chen, Q., Liu, L., Li, D., 2018. Comparative analysis of modeling algorithms for forest aboveground biomass estimation in a subtropical region, Remote Sensing, Vol. 10, pp. 1-22.
Kumar, S., Lal, R., Liu, D., 2012. A geographically weighted regression kriging approach for mapping soil organic carbon stock, Geoderma, Vol. 189, pp. 627–34.
Lloyd, C.D., 2010. Nonstationary models for exploring and mapping monthly precipitation in the United Kingdom, Internation Journal of Climatology, Vol. 30, pp. 390–405.
Propastin, P., 2010. Multiscale analysis of the relationship between topography and aboveground biomass in the tropical rainforests of Sulawesi, Indonesia, International Journal of Geographical Information Science, Vol. 25, pp. 455-472.
Propastin, P., 2012. Modifying geographically weighted regression for estimating aboveground biomass in tropical rainforests by multispectral remote sensing data. International Journal of Applied Earth Observation and Geoinformation, Vol. 18, pp. 82–90.
Van der Laan, C., Verweij, P.A., Quiñones, M.J., Faaij, A.P.C., 2014. Analysis of biophysical and anthropogenic variables and their relation to the regional spatial variation of aboveground biomass illustrated for North and East Kalimantan, Borneo, Carbon Balance and Management, Vol. 9, pp. 2-12.
Chen, L., Ren, C., Zhang, B., Wang, Z., Xi, Y., 2018. Estimation of Forest Above-Ground Biomass by Geographically Weighted Regression and Machine Learning with Sentinel Imagery, Forests, Vol. 9, pp. 1–20.
Brunsdon, C., Fotheringham, A.S., Charlton, M.E., 1996. Geographically Weighted Regression, Geographical Analysis, Vol. 28, pp. 281-298.
Kupfer, J.A., Farris, C.A. 2007. Incorporating spatial non-stationarity of regression coefficients into predictive vegetation models, Landsc Ecology, Vol. 22, pp. 837–52.
Harris, P., Fotheringham, A.S., Crespo, R., Charlton, M., 2010. The Use of Geographically Weighted Regression for Spatial Prediction: An Evaluation of Models Using Simulated Data Sets, Math Geoscience, Vol, 42, pp. 657–80.
Wang, K., Zhang, C., Li, W., 2012. Comparison of geographically weighted regression and regression kriging for estimating the spatial distribution of soil organic matter, GIScience Remote Sensing, Vol. 49, pp. 915–32.
Liu, Y., Guo, L., Jiang, Q., Zhang, H., Chen, Y., 2015. Comparing geospatial techniques to predict SOC stocks, Soil & Tillage Research, Vol. 148, pp. 46–58.
Sohrabi, H., Shirvani, A., 2012. Allometric equations for estimating standing biomass of Atlantic Pistache (Pistacia atlantica var. mutica) in khojir National Park. Iranian Journal of Forest, Vol. 4, pp. 55-64. (In Persian)
Iranmanesh, Y., Sagheb Talebi, Kh., Sohrabi, H., Jalali, S.GH., Hosseini, S.M., 2014. Biomass and carbon Stocks of Brants oak (Quercus brantii Lindl.) in two vegetation forms in Lordegan, Chaharnahal & Bakhtiari Forests. Iranian Journal of Forest and Research, Vol. 22, pp. 762-749. (In Persian)
Yang, S.H., Liu, F., Song, X.D., Lu, Y.Y., Li, D.C., Zhao, Y.G., Zhang, G.L., 2019. Mapping topsoil electrical conductivity by a mixed geographically weighted regression kriging: A case study in the Heihe River Basin, northwest China. Ecological Indicator, Vol. 102, pp. 252–64.
Kang, D., Dall’erba, S., 2016. Exploring the spatially varying innovation capacity of the US counties in the framework of Griliches’ knowledge production function: a mixed GWR approach, Journal of Geographical Systems, Vol, 18, pp. 125–157.
Mishra, U., 2010. Predicting the Spatial Variation of the Soil Organic Carbon Pool at a Regional Scale, Soil & Water management & Conservation, Vol. 74, pp. 906-914.
Backéus, S., Wikström, P., Lämås, T., 2005. A model for regional analysis of carbon sequestration and timber production, Forest Ecology and Managenment, Vol. 216, pp. 28–40.
Azizi, Z., Hosseini, A., Iranmanesh , Y., 2015. Estimating Biomass of Single Oak Trees Using Terrestrial Photogrammetry, Journal of Environmental Science and Technology, Vol. 19, pp. 82–93.
Safari, A., Sohrabi, H., Powell, S., Shataee, S., 2017. A comparative assessment of multi-temporal Landsat 8 and machine learning algorithms for estimating aboveground carbon stock in coppice oak forests, International Journal Remote Sensing, Vol. 38, pp. 6407–32.
Bishop, T.F.A., Mcbratney, A.B., 2006. A comparison of prediction methods for the creation of field-extent soil property maps, Geoderma, Vol. 103, pp. 149-160.
Lu, D., 2006. The potential and challenge of remote sensing-based biomass estimation, International Journal of Remote Sensing, Vol. 27, pp. 1297–328.
6. Meng, Q., Cieszewski, C., Madden, M., 2009. Large area forest inventory using Landsat ETM+: A geostatistical approach, ISPRS Journal Photogrammetry and Remote Sensing, Vol. 64, pp. 27–36.
Viana, H., Aranha, J., Lopes, D., Cohen, W.B., 2011. Estimation of crown biomass of Pinus pinaster stands and shrubland above-ground biomass using forest inventory data , remotely sensed imagery and spatial prediction models, Ecological Modelling, Vol. 226, pp. 22–35.
Li, W., Niu, Z., Liang, X., Li, Z., Huang, N., Gao, S., Wang, Ch., Muhammad, Sh., 2015. Geostatistical modeling using LiDAR-derived prior knowledge with SPOT-6 data to estimate temperate forest canopy cover and above-ground biomass via stratified random sampling, International Journal of Applied Earth Observation and Geoinformation, Vol. 41, pp. 88–98.
Sinha, S., Jeganathan, C., Sharma, L.K., Nathawat, M.S., 2015. A review of radar remote sensing for biomass estimation, International Journal of Environmental Science and Technology, Vol. 12, pp. 1779–92.
Karl, J.W., 2010. Spatial Predictions of Cover Attributes of Rangeland Ecosystems Using Regression Kriging and Remote Sensing. Rangeland Ecology and Managenment, Vol. 63, pp. 335–49.
11. Hengl, T., Heuvelink, G.B.M., Rossiter, D.G., 2007. About regression-kriging: From equations to case studies. Computers & Geoscience, Vol. 33, pp. 1301–15.
Ahadi, Z., Alavi, S.J., Hoseini, S.M., 2017. Beech forest site productivity mapping using ordinary kriging and IDW (Case study: research forest of Tarbiat Modares University), Iranian Journal of Forest and Wood Product, Vol. 70, pp. 93-102. (In Persian)
Fayad, I., Baghdadi, N., Bailly, J., Barbier, N., Gond, V., Hajj, M. E.l., 2016. Supplementary Materials : Regional Scale Rain-Forest Height Mapping Using Regression-Kriging of Spaceborne and Airborne LiDAR Data : Application on French Guiana, Remote Sensing, Vol. 8, pp. 1–5.
Wu, C., Shen, H., Shen, A., Deng, J., Gan, M., Zhu, J., Xu, H, Wang, K., 2016. Comparison of machine-learning methods for above-ground biomass estimation based on Landsat imagery. Journal of Applied Remote Sensing, Vol. 10, pp. 035010-17.
Gao, Y., Lu, D., Li, G., Wang, G., Chen, Q., Liu, L., Li, D., 2018. Comparative analysis of modeling algorithms for forest aboveground biomass estimation in a subtropical region, Remote Sensing, Vol. 10, pp. 1-22.
Kumar, S., Lal, R., Liu, D., 2012. A geographically weighted regression kriging approach for mapping soil organic carbon stock, Geoderma, Vol. 189, pp. 627–34.
Lloyd, C.D., 2010. Nonstationary models for exploring and mapping monthly precipitation in the United Kingdom, Internation Journal of Climatology, Vol. 30, pp. 390–405.
Propastin, P., 2010. Multiscale analysis of the relationship between topography and aboveground biomass in the tropical rainforests of Sulawesi, Indonesia, International Journal of Geographical Information Science, Vol. 25, pp. 455-472.
Propastin, P., 2012. Modifying geographically weighted regression for estimating aboveground biomass in tropical rainforests by multispectral remote sensing data. International Journal of Applied Earth Observation and Geoinformation, Vol. 18, pp. 82–90.
Van der Laan, C., Verweij, P.A., Quiñones, M.J., Faaij, A.P.C., 2014. Analysis of biophysical and anthropogenic variables and their relation to the regional spatial variation of aboveground biomass illustrated for North and East Kalimantan, Borneo, Carbon Balance and Management, Vol. 9, pp. 2-12.
Chen, L., Ren, C., Zhang, B., Wang, Z., Xi, Y., 2018. Estimation of Forest Above-Ground Biomass by Geographically Weighted Regression and Machine Learning with Sentinel Imagery, Forests, Vol. 9, pp. 1–20.
Brunsdon, C., Fotheringham, A.S., Charlton, M.E., 1996. Geographically Weighted Regression, Geographical Analysis, Vol. 28, pp. 281-298.
Kupfer, J.A., Farris, C.A. 2007. Incorporating spatial non-stationarity of regression coefficients into predictive vegetation models, Landsc Ecology, Vol. 22, pp. 837–52.
Harris, P., Fotheringham, A.S., Crespo, R., Charlton, M., 2010. The Use of Geographically Weighted Regression for Spatial Prediction: An Evaluation of Models Using Simulated Data Sets, Math Geoscience, Vol, 42, pp. 657–80.
Wang, K., Zhang, C., Li, W., 2012. Comparison of geographically weighted regression and regression kriging for estimating the spatial distribution of soil organic matter, GIScience Remote Sensing, Vol. 49, pp. 915–32.
Liu, Y., Guo, L., Jiang, Q., Zhang, H., Chen, Y., 2015. Comparing geospatial techniques to predict SOC stocks, Soil & Tillage Research, Vol. 148, pp. 46–58.
Sohrabi, H., Shirvani, A., 2012. Allometric equations for estimating standing biomass of Atlantic Pistache (Pistacia atlantica var. mutica) in khojir National Park. Iranian Journal of Forest, Vol. 4, pp. 55-64. (In Persian)
Iranmanesh, Y., Sagheb Talebi, Kh., Sohrabi, H., Jalali, S.GH., Hosseini, S.M., 2014. Biomass and carbon Stocks of Brants oak (Quercus brantii Lindl.) in two vegetation forms in Lordegan, Chaharnahal & Bakhtiari Forests. Iranian Journal of Forest and Research, Vol. 22, pp. 762-749. (In Persian)
Yang, S.H., Liu, F., Song, X.D., Lu, Y.Y., Li, D.C., Zhao, Y.G., Zhang, G.L., 2019. Mapping topsoil electrical conductivity by a mixed geographically weighted regression kriging: A case study in the Heihe River Basin, northwest China. Ecological Indicator, Vol. 102, pp. 252–64.
Kang, D., Dall’erba, S., 2016. Exploring the spatially varying innovation capacity of the US counties in the framework of Griliches’ knowledge production function: a mixed GWR approach, Journal of Geographical Systems, Vol, 18, pp. 125–157.
Mishra, U., 2010. Predicting the Spatial Variation of the Soil Organic Carbon Pool at a Regional Scale, Soil & Water management & Conservation, Vol. 74, pp. 906-914.