Nonconcavity of the Spectral Radius in Levinger's Theorem

Abstract

Let A ∈ Rn × n be a nonnegative irreducible square matrix and let r( A) be its spectral radius and Perron-Frobenius eigenvalue. Levinger asserted and several have proven that r(t):=r((1-t) A + t A) increases over t ∈ [0,1/2] and decreases over t ∈ [1/2,1]. It has further been stated that r(t) is concave over t ∈ (0,1). Here we show that the latter claim is false in general through a number of counterexamples, but prove it is true for A ∈ R2× 2, weighted shift matrices (but not cyclic weighted shift matrices), tridiagonal Toeplitz matrices, and the 3-parameter Toeplitz matrices from Fiedler, but not Toeplitz matrices in general. A general characterization of the range of t, or the class of matrices, for which the spectral radius is concave in Levinger's homotopy remains an open problem.