The norms of powers of matrices with unit spectral radius

Let M + n be the set of entrywise nonnegative n × n matrices. Denote by r(A) the spectral radius (Perron root) of A ∈ M + n . Characterization is obtained for maps f : In particular, it is shown that such a map has the form for some S ∈ M + n with exactly one positive entry in each row and each co

The notion of spectral radius of a set of matrices is a natural extension of spectral radius of a single matrix. The finiteness conjecture (FC) claims that among the infinite products made from the elements of a given finite set of matrices, there is a certain periodic product, made from the repetit

## We prove the spectral radius inequality ρ(A for nonnegative matrices using the ideas of Horn and Zhang. We obtain the inequality A • B ρ(A T B) for nonnegative matrices, which improves Schur's classical inequality , where • denotes the spectral norm. We also give counterexamples to two conject