Orthogonal vs. Non-Orthogonal Reducibility of Matrix-Valued Measures

Abstract

A matrix-valued measure reduces to measures of smaller size if there exists a constant invertible matrix M such that M M* is block diagonal. Equivalently, the real vector space A of all matrices T such that T(X)=(X) T* for any Borel set X is non-trivial. If the subspace Ah of self-adjoints elements in the commutant algebra A of is non-trivial, then is reducible via a unitary matrix. In this paper we prove that A is *-invariant if and only if Ah= A, i.e., every reduction of can be performed via a unitary matrix. The motivation for this paper comes from families of matrix-valued polynomials related to the group SU(2)× SU(2) and its quantum analogue. In both cases the commutant algebra A=Ah iAh is of dimension two and the matrix-valued measures reduce unitarily into a 2× 2 block diagonal matrix. Here we show that there is no further non-unitary reduction.