Higher rank numerical ranges and low rank perturbations of quantum channels

Abstract

For a positive integer k, the rank-k numerical range k(A) of an operator A acting on a Hilbert space of dimension at least k is the set of scalars λ such that PAP = λ P for some rank k orthogonal projection P. In this paper, a close connection between low rank perturbation of an operator A and k(A) is established. In particular, for 1 r < k it is shown that k(A) ⊂eq k-r(A+F) for any operator F with (F) r. In quantum computing, this result implies that a quantum channel with a k-dimensional error correcting code under a perturbation of rank r will still have a (k-r)-dimensional error correcting code. Moreover, it is shown that if A is normal or if the dimension of A is finite, then k(A) can be obtained as the intersection of k-r(A+F) for a collection of rank r operators F. Examples are given to show that the result fails if A is a general operator. The closure and the interior of the convex set k(A) are completely determined. Analogous results are obtained for ∞(A) defined as the set of scalars λ such that PAP = λ P for an infinite rank orthogonal projection P. It is shown that ∞(A) is the intersection of all k(A) for k = 1, 2, >.... If A - μ I is not compact for any μ ∈ , then the closure and the interior of ∞(A) coincide with those of the essential numerical range of A. The situation for the special case when A-μ I is compact for some μ ∈ is also studied.