A generalization of Levinger's theorem to positive kernel operators
Abstract
We prove some inequalities for the spectral radius of positive operators on Banach function spaces. In particular, we show the following extension of Levinger's theorem. Let K be a positive compact kernel operator on L2(X,μ) with the spectral radius r(K). Then the function φ defined by φ(t) = r(t K + (1-t) K*) is non-decreasing on [0, 1/2]. We also prove that \| A + B* \| 2 · r(A B) for any positive operators A and B on L2(X,μ).
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