On the higher rank numerical range of the shift operator

Abstract

For any n-by-n complex matrix T and any 1≤slant k≤slant n, let k(T) the set of all λ∈ such that PTP=λ P for some rank-k orthogonal projection P be its higher rank-k numerical range. It is shown that if is the n-dimensional shift on n then its rank-k numerical range is the circular disc centred in zero and with radius kπn+1 if 1<k≤slant[n+12 ] and the empty set if [n+12 ]<k≤slant n, where [x ] denote the integer part of x. This extends and rafines previous results of U. Haagerup, P. de la Harpe Haagerup on the classical numerical range of the n-dimensional shift onn. An interesting result for higher rank-k numerical range of nilpotent operator is also established.