K-families and CPD-H-extendable families

Abstract

We introduce, for any set S, the concept of K-family between two Hilbert C*-modules over two C*-algebras, for a given completely positive definite (CPD-) kernel K over S between those C*-algebras and obtain a factorization theorem for such K-families. If K is a CPD-kernel and E is a full Hilbert C*-module, then any K-family which is covariant with respect to a dynamical system (G,η,E) on E, extends to a K-family on the crossed product E ×η G, where K is a CPD-kernel. Several characterizations of K-families, under the assumption that E is full, are obtained and covariant versions of these results are also given. One of these characterizations says that such K-families extend as CPD-kernels, between associated (extended) linking algebras, whose (2,2)-corner is a homomorphism and vice versa. We discuss a dilation theory of CPD-kernels in relation to K-families.