Random 2D linear cocycles II: Statistical properties

Pedro Duarte; Marcelo Durães; Tomé Graxinha; Silvius Klein

doi:10.4171/jst/601

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Random 2D linear cocycles II: Statistical properties

Pedro Duarte
Universidade de Lisboa and CEMS.UL, Portugal
Marcelo Durães
Pontifícia Universidade Católica do Rio de Janeiro (PUC-Rio), Brazil; Universidade de Lisboa and CEMS.UL, Portugal
- zbMATH
- ORCID
Tomé Graxinha
Universidade de Lisboa and CEMS.UL, Portugal
- zbMATH
- ORCID
Silvius Klein
Pontifícia Universidade Católica do Rio de Janeiro (PUC-Rio), Brazil

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Abstract

Consider the space of two-dimensional random linear cocycles over a shift in finitely many symbols, with at least one singular and one invertible matrix. We provide an explicit formula for the unique stationary measure associated to such cocycles and establish a Furstenberg-type formula characterizing the Lyapunov exponent. Using the spectral properties of the corresponding Markov operator and a parameter elimination argument, we prove that Lebesgue almost every cocycle in this space satisfies large deviations estimates and a central limit theorem.

Cite this article

Pedro Duarte, Marcelo Durães, Tomé Graxinha, Silvius Klein, Random 2D linear cocycles II: Statistical properties. J. Spectr. Theory (2026), published online first

DOI 10.4171/JST/601