Global Lp-Lq estimates for solutions to the third initial-boundary value problem for the heat equation in a bounded domain

Abstract

We discuss the unique solvability of the third initial-boundary value problem for the heat equation in a bounded domain. This problem has uniquely a time-global solution in the anisotropic Sobolev space W2,1p,q for any 1<p<∞, 1<q<∞. Moreover, exponentially weighted Lp-Lq estimates for time-global solutions can be established. We prove the above properties by Lp estimates for steady solutions to the heat equation, the theory of analytic semigroups on Banach spaces and the operator-valued Fourier multiplier theorem on UMD spaces.