On Matrix-Valued Square Integrable Positive Definite Functions

Abstract

In this paper, we study matrix valued positive definite functions on a unimodular group. We generalize two important results of Godement on square integrable positive definite functions to matrix valued square integrable positive definite functions. We show that a matrix-valued continuous L2 positive definite function can always be written as a convolution of a L2 positive definite function with itself. We also prove that, given two L2 matrix valued positive definite functions and , ∫G Trace((g) (g)t) d g ≥ 0. In addition this integral equals zero if and only if * =0. Our proofs are operator-theoretic and independent of the group.