On the Ilmonen-Haukkanen-Merikoski Conjecture

Abstract

Let Kn be the set of all n× n lower triangular (0,1)-matrices with each diagonal element equal to 1, Ln = \ YYT: Y∈ Kn\ and let equation* cn = Z∈ Ln μn(1)(Z):μn(1) (Z) is the smallest eigenvalue of Z . equation* The Ilmonen-Haukkanen-Merikoski conjecture (the IHM conjecture) states that cn is equal to the smallest eigenvalue of Y0Y0T, where equation* (Y0)ij= \ arraycl 0 & if \ i<j, 1 & if \ i=j, 1-(-1)i+j2 & if \ i>j. array . equation* In this paper we present a proof of this conjecture. In our proof we use an inequality for spectral radii of nonnegative matrices.