Large deviations for the maximum and reversed order statistics of Weibull-like variables

Abstract

Motivated by metastability in the zero-range process, we consider i.i.d.\ random variables with values in 0 and Weibull-like (stretched exponential) law P(Xi =k) = c ( - kα), α ∈ (0,1). We condition on large values of the sum Sn= μ n + s nγ and prove large deviation principles for the rescaled maximum Mn /nγ and for the reversed order statistics. The scale is nγ with γ = 1/(2-α); on that scale, the big-jump principle for heavy-tailed variables and a naive normal approximation for moderate deviations yield bounds of the same order nγ α = n2γ-1, the speed of the large deviation principles. The rate function for Mn/nγ is non-convex and solves a recursive equation similar to a Bellman equation.

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