A generalized polar-coordinate integration formula with applications to the study of convolution powers of complex-valued functions on Zd

Abstract

In this article, we consider a class of functions on Rd, called positive homogeneous functions, which interact well with certain continuous one-parameter groups of (generally anisotropic) dilations. Generalizing the Euclidean norm, positive homogeneous functions appear naturally in the study of convolution powers of complex-valued functions on Zd. As the spherical measure is a Radon measure on the unit sphere which is invariant under the symmetry group of the Euclidean norm, to each positive homogeneous function P, we construct a Radon measure σP on S=\η ∈ Rd:P(η)=1\ which is invariant under the symmetry group of P. With this measure, we prove a generalization of the classical polar-coordinate integration formula and deduce a number of corollaries in this setting. We then turn to the study of convolution powers of complex functions on Zd and certain oscillatory integrals which arise naturally in that context. Armed with our integration formula and the Van der Corput lemma, we establish sup norm-type estimates for convolution powers; this result is new and partially extends results of [20] and [21].