Inverse problems for symmetric doubly stochastic matrices whose Suleimanova spectra are bounded below by 1/2

Abstract

A new sufficient condition for a list of real numbers to be the spectrum of a symmetric doubly stochastic matrix is presented; this is a contribution to the classical spectral inverse problem for symmetric doubly stochastic matrices that is still open in its full generality. It is proved that whenever λ2, …, λn are non-positive real numbers with 1 + λ2 + … + λn ≥slant 1/2, then there exists a symmetric, doubly stochastic matrix whose spectrum is precisely (1, λ2, …, λn). We point out that this criterion is incomparable to the classical sufficient conditions due to Perfect-Mirsky, Soules, and their modern refinements due to Nader et al. We also provide some examples and applications of our results.