On factorization of the shift semigroup

Abstract

Let be a finite dimensional Hilbert space. This note finds all factorizations of the right shift semigroup =(St)t 0 on L2(+,) into the product of n commuting contractive semigroups, i.e., characterizes all n-tuples of commuting semigroups (1,2,...,n) where i=(Vi,t)t 0 for i=1,2,...,n are semigroups of contractions satisfying Vi,tVj,t=Vj,tVi,t for all i and j and St=V1,tV2,t·s Vn,t for all t 0. The factorizations are characterized by tuples of self-adjoint operators A=(A1,A2,...,An) and tuples of positive contractions B=(B1,B2,...,Bn) on satisfying certain conditions which are stated in thm:psi12. One of the tools of our analysis is a convexity argument using the extreme points of the Herglotz class of functions \[P:=\f: is analytic, f>0 and f(0)=1 \.\]