Zero-dilation indices and numerical ranges

Abstract

The zero-dilation index d(A) of a matrix A is the largest integer k for which bmatrix0k& *\\ * & *bmatrix is unitarily similar to A. In this study, the zero-dilation indices of certain block matrices are considered, namely, the block matrix analogues of companion matrices and upper triangular KMS matrices, respectively shown as \[C=bmatrix 0& j=1m-1Aj \\ B0& [Bj]j=1m-1bmatrix\ and\ K=bmatrix0& A& A2&·s& Am-1\\ 0 & 0& A& & \\ 0& 0 &0 && A2\\ & & & & A\\ 0& 0 & 0& ·s &0bmatrix\] where C and K are mn-by-mn and Aj,Bj,A are n-by-n. Provided j=1m-1Aj is nonsingular, it is proved that d(C) satisfies the following: if m≥ 3 is odd (respectively, m≥ 2 is even), then (m-1)n2≤ d(C)≤ (m+1)n2 (respectively, d(C)= mn2). In the odd m case, examples are given showing that it is possible to get as zero-dilation index each integer value between (m-1)n2 and (m+1)n2. On the other hand, d(K) is proved to be equal to the number of nonnegative eigenvalues of (K+K*)/2. Alternative characterizations of d(K) are given. The circularity of the numerical range of K is also considered.

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