Berry-Esseen type bounds for the Left Random Walk on GL d (R) under polynomial moment conditions
Abstract
Let An= n ·s 1, where (n)n ≥ 1 is a sequence of independent random matrices taking values in GLd( R), d ≥ 2, with common distribution μ. In this paper, under standard assumptions on μ (strong irreducibility and proximality), we prove Berry-Esseen type theorems for ( An ) when μ has a polynomial moment. More precisely, we get the rate (( n) / n)q/2-1 when μ has a moment of order q ∈ ]2,3] and the rate 1/ n when μ has a moment of order 4, which significantly improves earlier results in this setting.
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