Dilations of matricies

Abstract

We explore aspects of dilation theory in the finite dimensional case and show that for a commuting n-tuple of operators T=(T1,...,Tn) acting on some finite dimensional Hilbert space H and a compact set X⊂ Cn the following are equivalent: 1. T has a normal X-dilation. 2. For any m∈ N there exists some finite dimensional Hilbert space K containing H and a tuple of commuting normal operators N=(N1,...,Nn) acting on K such that q(T)=PHq(N)|H for all polynomials q of degree at most m and such that the joint spectrum of N is contained in X (where PH is the projection from K to H).