Table 1 Mathematical models applied to the drying curves
From: Electrohydrodynamic (EHD) drying of the Chinese wolfberry fruits
Model name | Model equation | References |
|---|---|---|
Lewis (Newton) | \({\text{MR}} = e^{ - kt}\) | Liu et al. (2009) |
Henderson and Pabis | \({\text{MR}} = ae^{ - kt}\) | Shen et al. (2011) |
Logarithmic | \({\text{MR}} = ae^{ - kt} + b\) | Shahhoseini et al. (2013) |
Parabolic (polynomial) | \({\text{MR}} = a + bt + ct^{2}\) | Bai et al. (2011) |
Page | \({\text{MR}} = e^{{ - kt^{n} }}\) | Li et al. (2005) |
Dinani et al. | \({\text{MR}} = a\exp \left( { - \left( {\frac{t - b}{c}} \right)^{2} } \right)\) | Dinani et al. (2014) |
Wang and Singh | \({\text{MR}} = 1 + at + bt^{2}\) | Kaleta and Górnicki (2010) |
Modified Page | \({\text{MR}} = \exp \left( { - (kt)^{n} } \right)\) | Akpinar and Bicer (2008) |
Midilli et al. | \({\text{MR}} = a\exp \left( { - kt^{n} } \right) + bt\) | Midilli et al. (2002) |
Weibull | \({\text{MR}} = \exp \left( { - \left( {\frac{t}{b}} \right)^{a} } \right)\) | Puente-Díaz et al. (2013) |