Positive definite functions of noncommuting contractions, Hua-Bellman matrices, and a new distance metric

Abstract

We study positive definite functions on noncommuting strict contractions. In particular, we study functions that induce positive definite Hua-Bellman matrices (i.e., matrices of the form [(I-Ai*Aj)-α]ij where Ai and Aj are strict contractions and α∈C). We start by revisiting a 1959 work of bellman1959 (R.~Bellman~Representation theorems and inequalities for Hermitian matrices; Duke Mathematical J., 26(3), 1959) that studies Hua-Bellman matrices and claims a strengthening of hua1955's representation theoretic results on their positive definiteness~(L.-K. Hua, Inequalities involving determinants; Acta Mathematica Sinica, 5(1955), pp.~463--470). We uncover a critical error in Bellman's proof that has surprisingly escaped notice to date. We "fix" this error and provide conditions under which (I-A*B)-α is a positive definite function; our conditions correct Bellman's claim and subsume both Bellman's and Hua's prior results. Subsequently, we build on our result and introduce a new hyperbolic-like geometry on noncommuting contractions, and remark on its potential applications.