Self-similar solutions to the time-fractional Porous-Medium Equation

Abstract

We show the existence of self-similar solutions with constant finite mass to the time-fractional Porous-Medium Equation for all spatial dimensions d 1 and all exponents m>mc=(d-2)+/d. This range is optimal. We find two types of solution depending on the exponent: compactly supported solutions in the slow-diffusion range m > 1 and positive solutions with heavy tails in the sub-critical fast-diffusion range mc < m < 1. The self-similar solutions in the linear case m=1 were already known explicitly obtained by the Fourier transform, and we discuss their properties in our settings and the limit m 1.