Indices of diagonalizable and universal realizability of spectra

Abstract

A list =\λ 1,… ,λ n\ of complex numbers (repeats allowed) is said to be realizable if it is the spectrum of an entrywise nonnegative matrix A. is diagonalizably realizable if the realizing matrix A is diagonalizable. is said to be universally realizable if it is \ realizable for each possible Jordan canonical form allowed by . Here, we study the connection between diagonalizable realizability and universal realizability of spectra. In particular, we establish \ indices of realizability for diagonalizable and universal realizability. We also define the merge of two spectra and we prove a result that allow us to easily decide, in many cases, about the universal realizability of spectra.