Decomposition of the tensor product of two Hilbert modules

Abstract

Given a pair of positive real numbers α, β and a sesqui-analytic function K on a bounded domain ⊂ Cm, in this paper, we investigate the properties of the sesqui-analytic function K(α, β):= Kα+β(∂i∂j K )i,j=1 m, taking values in m× m matrices. One of the key findings is that K(α, β) is non-negative definite whenever Kα and Kβ are non-negative definite. In this case, a realization of the Hilbert module determined by the kernel K(α,β) is obtained. Let Mi, i=1,2, be two Hilbert modules over the polynomial ring C[z1, …, zm]. Then C[z1, …, z2m] acts naturally on the tensor product M1 M2. The restriction of this action to the polynomial ring C[z1, …, zm] obtained using the restriction map p p| leads to a natural decomposition of the tensor product M1 M2, which is investigated. Two of the initial pieces in this decomposition are identified.