On Fillmore's theorem extended by Borobia

Abstract

Fillmore Theorem says that if A is an nxn complex non-scalar matrix and γ1,...,γn are complex numbers with γ1+...+γn=trA, then there exists a matrix B similar to A with diagonal entries γ1,...,γn. Borobia simplifies this result and extends it to matrices with integer entries. Fillmore and Borobia do not consider the nonnegativity hypothesis. Here, we introduce a different and very simple way to compute the matrix B similar to A with diagonal γ1,...,γn. Moreover, we consider the nonnegativity hypothesis and we show that for a list =λ1,...,λn of complex numbers of Suleimanova or Smigoc type, and a given list =γ1,...,γn of nonnegative real numbers, the remarkably simple condition γ1+...+γn=λ1+...+λn is necessary and sufficient for the existence of a nonnegative matrix with spectrum and diagonal entries . This surprising simple result improves a condition recently given by Ellard and Smigoc in arXiv:.1702.02650v1.