https://doi.org/10.1351/goldbook.M03754
The @H02805@ defined for the case of the @L03532@. A more general definition in terms of the @E01952-1@ is: \[k_{\text{d}}=\frac{j\ \nu }{n\ F\ (c_{\text{e}}- c_{0})}\] or \[k_{\text{d}} = \frac{j\ \nu \ (1- t_{\text{B}}\ n\ \nu ^{-1}\ z_{\text{B}}^{-1})}{n\ F\ (c_{\text{e}}- c_{0})}\] where \(j\) is the @E01952-2@, \(\nu \) is the @S06025@, \(n\) is the @C00995@, \(F\) is the @F02325@, \(c_{\text{e}}\) is the @I03083@, \(c_{0}\) is the @B00753@, \(t_{\text{B}}\) is the @T06489@ of species B, and \(z_{\text{B}}\) is the @C00993@ of species B.