Commuting normal operators and joint numerical range

Abstract

Let H be a complex Hilbert space and let B( H) be the algebra of all bounded linear operators on H. For a positive integer k less than the dimension of H and A = (A1, …, Am)∈ B( H)m, the joint k-numerical range Wk( A) is the set of (α1, …, αm) ∈ Cm such that αi = Σj = 1k Aixj, xj for an orthonormal set \x1, …, xk\ in H. Relations between the geometric properties of Wk( A) and the algebraic and analytic properties of A1, …, Am are studied. It is shown that there is k∈ N such that Wk( A) is a polyhedral set, i.e., the convex hull of a finite set, if and only if A1, …, Ak have a common reducing subspace V of finite dimension such that the compression of A1, …, Am on the subspace V are diagonal operators D1, …, Dm and Wk( A) = Wk(D1, …, Dm). Characterization is also given to A such that the closure of Wk( A) is polyhedral. The conditions are related to the joint essential numerical range of A. These results are used to study A such that (a) \A1, …, Am\ is a commuting family of normal operators, or (b) Wk(A1, …, Am) is polyhedral for every positive integer k. It is shown that conditions (a) and (b) are equivalent for finite rank operators but it is no longer true for compact operators. Characterizations are given for compact operators A1, …, Am satisfying (a) and (b), respectively. Results are also obtained for general non-compact operators.