Pointwise convergence to initial data for some evolution equations on symmetric spaces

Abstract

Let L be either the Laplace--Beltrami operator, its shift without spectral gap, or the distinguished Laplacian on a symmetric space of noncompact type X of arbitrary rank. We consider the heat equation, the fractional heat equation, and the Caffarelli--Silvestre extension problem associated with L, and in each of these cases we characterize the weights v on X for which the solution converges pointwise a.e. to the initial data when the latter is in Lp(v), 1≤ p < ∞. As a tool, we also establish vector-valued weak type (1,1) and Lp estimates (1<p<∞) for the local Hardy--Littlewood maximal function on X.