# Uniqueness of very weak solutions for a fractional filtration equation

**Authors:** Gabriele Grillo, Matteo Muratori, Fabio Punzo

arXiv: 1905.07717 · 2020-02-06

## TL;DR

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## Contribution

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## Abstract

We prove existence and uniqueness of distributional, bounded, nonnegative solutions to a fractional filtration equation in ${\mathbb R}^d$. With regards to uniqueness, it was shown even for more general equations in [19] that if two bounded solutions $u,w$ of (1.1) satisfy $u-w\in L^1({\mathbb R}^d\times(0,T))$, then $u=w$. We obtain here that this extra assumption can in fact be removed and establish uniqueness in the class of merely bounded solutions, provided they are nonnegative. Indeed, we show that a minimal solution exists and that any other solution must coincide with it. As a consequence, distributional solutions have locally-finite energy.

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Source: https://tomesphere.com/paper/1905.07717