Critical exponent and sharp lifespan estimates for semilinear third-order evolution equations

Abstract

We study semilinear third-order (in time) evolution equations with fractional Laplacian (-)σ and power nonlinearity |u|p, which was proposed by Bezerra-Carvalho-Santos [2] recently. In this manuscript, we obtain a new critical exponent p=pcrit(n,σ):=1+6σ\3n-4σ,0\ for n≤slant103σ. Precisely, the global (in time) existence of small data Sobolev solutions is proved for the supercritical case p>pcrit(n,σ), and weak solutions blow up in finite time even for small data if 1<p≤slant pcrit(n,σ). Furthermore, to more accurately describe the blow-up time, we derive new and sharp upper bound as well as lower bound estimates for the lifespan in the subcritical case and the critical case.