Sharp energy estimates for nonlinear fractional diffusion equations

TL;DR

This paper establishes sharp energy estimates for bounded solutions of nonlinear fractional diffusion equations, leading to symmetry results in three dimensions for certain fractional powers, extending classical conjectures.

Contribution

It provides the first sharp energy estimates for solutions of fractional equations, proving one-dimensional symmetry in dimension three for specific fractional powers.

Findings

Sharp energy estimates for solutions depending on one variable

One-dimensional symmetry in dimension three for 1/2 ≤ s < 1

Extension of De Giorgi's conjecture to fractional equations

Abstract

We study the nonlinear fractional equation $(-\Delta)^s u = f(u)$ in $\mathbb{R}^n$, for all fractions $0<s<1$ and all nonlinearities $f$. For every fractional power $s \in (0,1)$, we obtain sharp energy estimates for bounded global minimizers and for bounded monotone solutions. They are sharp since they are optimal for solutions depending only on one Euclidian variable. As a consequence, we deduce the one-dimensional symmetry of bounded global minimizers and of bounded monotone solutions in dimension $n=3$ whenever $1/2 \leq s < 1$. This result is the analogue of a conjecture of De Giorgi on one-dimensional symmetry for the classical equation $-\Delta u = f(u)$ in $\mathbb{R}^n$. It remains open for $n=3$ and $s<1/2$, and also for $n \geq 4$ and all $s$.