Higher rank numerical ranges of normal matrices

Abstract

The higher rank numerical range is closely connected to the construction of quantum error correction code for a noisy quantum channel. It is known that if a normal matrix A ∈ Mn has eigenvalues a1, \..., an, then its higher rank numerical range k(A) is the intersection of convex polygons with vertices aj1, \..., ajn-k+1, where 1 j1 < \... < jn-k+1 n. In this paper, it is shown that the higher rank numerical range of a normal matrix with m distinct eigenvalues can be written as the intersection of no more than \m,4\ closed half planes. In addition, given a convex polygon P a construction is given for a normal matrix A ∈ Mn with minimum n such that k(A) = P. In particular, if P has p vertices, with p 3, there is a normal matrix A ∈ Mn with n \p+k-1, 2k+2 \ such that k(A) = P.