Positive definite functions

Abstract

Recently, Guella & Menegatto & Peron and Berg & Porcu obtained results about the characterization of continuous, positive definite, complex valued kernels defined in the product of two real spheres and in the product of real spheres with a locally compact group. Results about strict positive definiteness were also proved for some of these kernels and for matrix valued functions defined in the product of two real spheres (Bonfim & Menegatto, Guella & Menegatto, Guella & Menegatto & Peron).In this project we propose to obtain new results about the characterization of positive definite functions, in several contexts:We will consider continuous complex valued kernels in the product of complex spheres with a locally compact group, and also continuous matrix valued functions defined in the product of real spheres with a locally compact group.We also propose to find a characterization of strict positive definiteness in these and some other cases.In more details, we would like to solve the following problems:1. characterizing the positive definite kernels in the product of complex spheres with a locally compact group;2. characterizing, by exploiting the above result, the strict positive definiteness of such kernels;3. characterizing the positive definite, matrix valued functions defined in the product of real spheres with a locally compact group;4. characterizing the strictly positive definite kernels in the product of real spheres with a locally compact group. With particular interest, for the cases in which the group is the circle or, because of its applications, the group is the real line.