On the joint spectra of doubly commuting n-tuples of semi-normal operators

Abstract

Let H be a complex Hilbert space. For any operator (bounded linear transformation) T on H, we denote the spectrum of T by σ(T). Let T = (T₁, …, T_n) be an n-tuple of commuting operators on H. Let Sp(T) be the Taylor joint spectrum of T. We refer the reader to [8] for the definition of Sp(T). A point v = (v₁, …, v_n) of ℂⁿ is in the joint approximate point spectrum σ_π(T) of T if there exists a sequence {x_k} of unit vectors in H such that .A point v = (v₁, …, v_n) of ℂⁿ is in the joint approximate compression spectrum σ_s(T) of T if there exists a sequence {x_k} of unit vectors in H such that A point v=(v₁, …, v_n) of ℂⁿ is in the joint point spectrum σ_p(T) of T if there exists a non-zero vector x in H such that (T_i-v_i)x = 0 for all i, 1 ≤ j ≤ n.