Dirichlet eigenfunction and heat kernel estimates on annular domains

Abstract

Motivated by Euclidean boxes, we consider "thin" annular domains of the form U=(a,b)× U0⊂eq Rn in polar coordinates, where the spherical base U0⊂eq Sn-1 is an inner uniform domain. We show that, with respect to the measure U2 determined by the principal Dirichlet Laplacian eigenfunction U, such annular domains satisfy volume doubling and Poincar\'e inequalities uniformly over all locations and scales. This implies sharp Dirichlet heat kernel estimates expressed in terms of U. Our results hold uniformly over the collection of all annuli in Rn. We also give matching two-sided bounds for the first Dirichlet Laplacian eigenfunction and eigenvalue for some annular domains including annuli in Rn. Moreover, we prove eigenfunction inequalities for U under domain perturbations of U. The proofs of our main results utilize eigenfunction comparison techniques due to Lierl and the authors (arXiv:1210.4586, arXiv:2504.18783), small scale U2-Poincar\'e inequalities, as well as a discretization technique of Coulhon and Saloff-Coste. Finally, our methods also imply uniform Neumann heat kernel estimates for thin annular domains.

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