Classification of Blow-ups and Monotonicity Formula for Half Laplacian Nonlinear Heat Equation

Abstract

We consider the nonlinear half laplacian heat equation ut+(-)12 u-|u|p-1u=0, Rn× (0, T). We prove that all blows-up are type I, provided that n ≤ 4 and 1<p<p* (n) where p* (n) is an explicit exponent which is below n+1n-1, the critical Sobolev exponent. Central to our proof is a Giga-Kohn type monotonicity formula for half laplacian and a Liouville type theorem for self-similar nonlinear heat equation. This is the first instance of a monotonicity formula at the level of the nonlocal equation, without invoking the extension to the half-space.