Delsarte-type extremal problems and convolution roots on homogeneous spaces
Abstract
For a locally compact group G and compact subgroup K, we consider a Delsarte-type extremal problem for G-invariant positive definite kernels on the homogeneous space G/K, generalising a certain Tur\'an problem for isotropic positive definite kernels on the unit sphere Sd in Rd+1. We exploit a correspondence between G-invariant kernels on G/K and K-bi-invariant functions on G to show that the Delsarte-type problem on a homogeneous space is equivalent to a Delsarte-type problem for K-bi-invariant functions on its group G of transformations. We use this correspondence to show the existence of an extremal function for the Delsarte problem on the homogeneous space. In the case where (G,K) is a compact Gelfand pair, we show the existence of K-bi-invariant convolution roots for positive definite K-bi-invariant functions, consequently obtaining the existence of a G-invariant convolution root for G-invariant positive definite kernels.
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