Resumen
Solar irradiance is an available resource that could support electrification in regions that are low on socio-economic indices. Therefore, it is increasingly important to understand the behavior of solar irradiance. and data on solar irradiance. Some locations, especially those with a low socio-economic population, do not have measured solar irradiance data, and if such information exists, it is not complete. There are different approaches for estimating solar irradiance, from learning models to empirical models. The latter has the advantage of low computational costs, allowing its wide use. Researchers estimate solar energy resources using information from other meteorological variables, such as temperature. However, there is no broad analysis of these techniques in tropical and mountainous environments. Therefore, in order to address this gap, our research analyzes the performance of three well-known empirical temperature-based models?Hargreaves and Samani, Bristol and Campbell, and Okundamiya and Nzeako?and proposes a new one for tropical and mountainous environments. The new empirical technique models daily solar irradiance in some areas better than the other three models. Statistical error comparison allows us to select the best model for each location and determines the data imputation model. Hargreaves and Samani?s model had better results in the Pacific zone with an average RMSE of 936,195 [Wh/m2 day]
936
,
195
Wh
/
m
2
day
, SD of 36,01%
SD
of
36
,
01
%
, MAE of 748,435 [Wh/m2 day],
MAE
of
748
,
435
Wh
/
m
2
day
,
and U95 of 1.836,325 [Wh/m2 day]
U
95
of
1.836
,
325
Wh
/
m
2
day
. The new proposed model showed better results in the Andean and Amazon zones with an average RMSE of 1.032,99 [Wh/m2 day]
RMSE
of
1.032
,
99
Wh
/
m
2
day
, SD of 34,455 [Wh/m2 day]
SD
of
34
,
455
Wh
/
m
2
day
, MAE of 825,46 [Wh/m2 day]
MAE
of
825
,
46
Wh
/
m
2
day
, and U95 of 2.025,84 [Wh/m2 day]
U
95
of
2.025
,
84
Wh
/
m
2
day
. Another result was the linear relationship between the new empirical model constants and the altitude of 2500 MASL (mean above sea level).