What does this research mean for the field?

The exponential growth rate of the spectral radius of $ extrm{GL}(d, ext{R})$-valued cocycles converges to the top Lyapunov exponent of the cocycle under certain conditions. Novelty: ClaimNovelty.NOVEL_FINDING. Consensus alignment: ConsensusAlignment.NEUTRAL.

What question did this study set out to answer?

The central aim is to determine conditions under which the spectral radius of certain cocycles exhibits exponential behavior.

March 12, 2026

Asymptotic Behavior of the Spectral Radius of Locally Constant Strongly Irreducible Cocycles

Key Points

The central aim is to determine conditions under which the spectral radius of certain cocycles exhibits exponential behavior.
Analyzed $ extrm{GL}(d, ext{R})$-valued cocycles over a subshift of finite type with an equilibrium state.
Utilized large deviation estimates related to linear cocycles.
Established connections between spectral radius and Lyapunov exponents.
Identified conditions leading to convergence of exponential growth rate to the top Lyapunov exponent.
Provided partial answers to questions posed by Aoun and Sert about spectral properties of cocycles.

Abstract

Abstract We establish some conditions under which GL (d, R) -valued cocycles over a subshift of finite type equipped with an equilibrium state exhibit exponential asymptotics for the spectral radius. Specifically, we show that the exponential growth rate of the spectral radius converges to the top Lyapunov exponent of the cocycle. This result provides a partial answer to a question posed by Aoun and Sert in 2. Our approach relies on large deviation estimates for linear cocycles, which may be of independent interest.

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Asymptotic Behavior of the Spectral Radius of Locally Constant Strongly Irreducible Cocycles

Key Points

Abstract

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