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In the previous studies, from the Fokker-Planck equation the general spatial transport equation, which contains an infinite number of spatial derivative terms $T_n=\kappa_{nz}\partial^n{F}/ \partial{z^n}$ with $n=1, 2, 3, \cdots$, was derived. Due to the complexity of the general equation, some simplified equations with finite spatial derivative terms have been used in astrophysical researches, e.g., the diffusion equation, the hyperdiffusion one, subdiffusion transport one, etc. In this paper, the simplified equations with the highest order spatial derivative terms up to the first-, second-, third-, fourth-, and fifth-order are listed, and their transport coefficient formulas are derived, respectively. We find that most of the transport coefficients are determined by the corresponding statistical quantities. In addition, we find that the well-known statistical quantities, skewness $\mathcal{S}$ and kurtosis $\mathcal{K}$, are determined by some transport coefficients. The results can help one to use different transport coefficients determined by the statistical quantities, including many that are relatively new found in this paper, to study charged particle parallel transport processes. |
