Numerical Ranges of KMS Matrices

Abstract

A KMS matrix is one of the form Jn(a)=[arrayccccc 0 & a & a2 &... & an-1 & 0 & a & & & & & & a2 & & & & a 0 & & & & 0array] for n 1 and a in C. Among other things, we prove the following properties of its numerical range: (1) W(Jn(a)) is a circular disc if and only if n=2 and a≠ 0, (2) its boundary ∂ W(Jn(a)) contains a line segment if and only if n 3 and |a|=1, and (3) the intersection of the boundaries ∂ W(Jn(a)) and ∂ W(Jn(a)[j]) is either the singleton \σ( Jn(a))\ if n is odd, j=(n+1)/2 and |a|>1, or the empty set if otherwise, where, for any n-by-n matrix A, A[j] denotes its jth principal submatrix obtained by deleting its jth row and jth column (1 j n), A its real part (A+A*)/2, and σ(A) its spectrum.