随机矩阵乘积系数的贝里内界和局部极限定理

IF 1.1 2区数学 Q1 MATHEMATICS Journal of the Institute of Mathematics of Jussieu Pub Date : 2021-10-18 DOI:10.1017/s1474748022000561

T. Dinh, Lucas Kaufmann, Hao Wu

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引用次数: 10

摘要

设$\mu $为$\mathrm {GL}_d(\mathbb {R})$上的概率测度，用$S_n:= g_n \cdots g_1$表示相关联的随机矩阵积，其中$g_j$为i.i.d，法则为$\mu $。在假设$\mu $具有有限指数矩并产生一个近端强不可约半群的情况下，我们证明了$S_n$的系数具有最优率$O(1/\sqrt n)$的Berry-Esseen界，从而解决了自Guivarc 'h和Raugi的基础工作以来一直被考虑的一个长期问题。得到了系数的局部极限定理，补充了Grama、Quint和Xiao最近的部分结果。

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BERRY–ESSEEN BOUND AND LOCAL LIMIT THEOREM FOR THE COEFFICIENTS OF PRODUCTS OF RANDOM MATRICES

Let

$\mu $

be a probability measure on

$\mathrm {GL}_d(\mathbb {R})$

, and denote by

$S_n:= g_n \cdots g_1$

the associated random matrix product, where

$g_j$

are i.i.d. with law

$\mu $

. Under the assumptions that

$\mu $

has a finite exponential moment and generates a proximal and strongly irreducible semigroup, we prove a Berry–Esseen bound with the optimal rate

$O(1/\sqrt n)$

for the coefficients of

$S_n$

, settling a long-standing question considered since the fundamental work of Guivarc’h and Raugi. The local limit theorem for the coefficients is also obtained, complementing a recent partial result of Grama, Quint and Xiao.

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来源期刊

Journal of the Institute of Mathematics of Jussieu 数学-数学

CiteScore

2.40

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of the Institute of Mathematics of Jussieu publishes original research papers in any branch of pure mathematics; papers in logic and applied mathematics will also be considered, particularly when they have direct connections with pure mathematics. Its policy is to feature a wide variety of research areas and it welcomes the submission of papers from all parts of the world. Selection for publication is on the basis of reports from specialist referees commissioned by the Editors.

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