Two inequalities for the Perron Root

If A,B are irreducible, nonnegative n×n matrices with a common right eigenvector and a common left eigenvector corresponding to their respective spectral radii r(A), r(B), then it is shown that for any tϵ[0, 1], r(tA+(1−t)B^t)⩾tr(A)+ (1−t)r(B), where B^t is the transpose of B. Another inequality is proved that involves r(A) and r(Σ_lD^lAE^l), where A is a nonnegative, irreducible matrix and D^l, E^l are positive definite diagonal matrices. These inequalities generalize previous results due to Levinger and due to Friedland and Karlin.