Schauder bases and the decay rate of the heat equation

Abstract

We consider the classical Cauchy problem for the linear heat equation and integrable initial data in the Euclidean space RN. In the case N=1 we show that given a weighted Lp-space Lwp(R) with 1 ≤ p < ∞ and a fast growing weight w, there is a Schauder basis (en)n=1∞ in L wp(R) with the following property: given a positive integer m there exists nm > 0 such that, if the initial data f belongs to the closed linear space of en with n ≥ nm, then the decay rate of the solution of the heat equation is at least t-m. The result is also generalized to the case N >1 with a slightly weaker formulation. The proof is based on a construction of a Schauder basis of Lwp( RN), which annihilates an infinite sequence of bounded functionals.