Spectral Inclusion and C.N.E.

Abstract

1. An n-tuple S = (S₁, …, S_n) of commuting bounded linear operators on a Hilbert space H is said to have commuting normal extension if and only if there exists an n-tuple N = (N₁, …, N_n) of commuting normal operators on some larger Hilbert space K ⊃ H with the restrictions N_i|H = S_i, i = 1, …, n. If we take the minimal reducing subspace of N containing H, then N is unique up to unitary equivalence and is called the c.n.e. of S. (Here J denotes the multi-index (j₁, …, j_n) of nonnegative integers and N^*J = N₁^*j_l … N_n^*j_n and we emphasize that c.n.e. denotes minimal commuting normal extension.) If n = 1, then S₁ = S is called subnormal and N₁ = N its minimal normal extension (m.n.e.).