Large deviations for random hives and the spectrum of the sum of two random matrices

Abstract

Suppose α, β are Lipschitz strongly concave functions from [0, 1] to R and γ is a concave function from [0, 1] to R, such that α(0) = γ(0) = 0, and α(1) = β(0) = 0 and β(1) = γ(1) = 0. For an n × n Hermitian matrix W, let spec(W) denote the vector in Rn whose coordinates are the eigenvalues of W listed in non-increasing order. Let λ = ∂- α, μ = ∂- β on (0, 1] and = ∂- γ, at all points of (0, 1], where ∂- is the left derivative, which is monotonically decreasing. Let λn(i) := n2(α(in)-α(i-1n)), for i ∈ [n], and similarly, μn(i) := n2(β(in)-β(i-1n)), and n(i) := n2(γ(in)-γ(i-1n)). Let Xn, Yn be independent random Hermitian matrices from unitarily invariant distributions with spectra λn, μn respectively. We define norm \|·\|I to correspond in a certain way to the sup norm of an antiderivative. For suitable λ and μ, we prove that the following limit exists. equation n → ∞ P[\|spec(Xn + Yn) - n\|I < n2 ε]n2.equation We interpret this limit in terms of the surface tension σ of continuum limits of the discrete hives defined by Knutson and Tao.

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