Local and Non-local Fractional Porous Media Equations

Abstract

Recently it was observed that the probability distribution of the price return in S\&P500 can be modeled by q-Gaussian distributions, where various phases (weak, strong super diffusion and normal diffusion) are separated by different fitting parameters (Phys Rev. E 99, 062313, 2019). Here we analyze the fractional extensions of the porous media equation and show that all of them admit solutions in terms of generalized q-Gaussian functions. Three kinds of "fractionalization" are considered: local, referring to the situation where the fractional derivatives for both space and time are local; non-local, where both space and time fractional derivatives are non-local; and mixed, where one derivative is local, and another is non-local. Although, for the local and non-local cases we find q-Gaussian solutions , they differ in the number of free parameters. This makes differences to the quality of fitting to the real data. We test the results for the S\&P 500 price return and found that the local and non-local schemes fit the data better than the classic porous media equation.