On the radius of analyticity of solutions to semi-linear parabolic systems

Abstract

We study the radius of analyticity~R(t) in space, of strong solutions to systems of scale-invariant semi-linear parabolic equations. It is well-known that near the initial time,~R(t)t-12 is bounded from below by a positive constant. In this paper we prove that~t→ 0 R(t)t-12= ∞, and assuming higher regularity for the initial data, we obtain an improved lower bound near time zero. As an application, we prove that for any global solution~u∈ C([0,∞); H12(3)) of the Navier-Stokes equations, there holds~t→ ∞ R(t)t-12= ∞.