Alternative probabilistic representations of Barenblatt-type solutions

Abstract

A general class of probability density functions \[u(x,t)=Ct-α d (1- (\|x\|ctα )β )+γ, x∈ Rd,t>0,\] is considered, containing as particular case the Barenblatt solutions arising, for instance, in the study of nonlinear heat equations. Alternative probabilistic representations of the Barenblatt-type solutions u(x,t) are proposed. In the one-dimensional case, by means of this approach, u(x,t) can be connected with the wave propagation.