Eventually nonnegative matrices are similar to seminonnegative matrices

In this paper we give necessary and sufficient conditions for a matrix in Jordan canonical form to be similar to an eventually nonnegative matrix whose irreducible diagonal blocks satisfy the conditions identified by Zaslavsky and Tam, and whose subdiagonal blocks (with respect to its Frobenius norm

## We prove that 2" is star-shaped with respect to (1, 0, . . . , 0) and that (1, A,, . . . , A,) ~j" is on the boundary of 2" if and only if 11, A,, . . . , A,) is not the spectrum of any positive matrix. As a consequence, attention is given to the problem of determining which nonnegative matrice

The Perron±Frobenius spectral theory of nonnegative matrices motivated an intensive study of the relationship between graph theoretic properties and spectral properties of matrices. While for about seventy years research focused on nonnegative matrices, in the past ®fteen years the study has been ex