English

Large deviations for quasi-periodic cocycles with singularities

Dynamical Systems 2015-07-13 v2 Mathematical Physics Classical Analysis and ODEs math.MP

Abstract

We derive large deviations type (LDT) estimates for linear cocycles over an ergodic multifrequency torus translation. These models are called quasi-periodic cocycles. We make the following assumptions on the model: the translation vector satisfies a generic Diophantine condition, and the fiber action is given by a matrix valued analytic function of several variables which is not identically singular. The LDT estimates obtained here depend on some uniform measurements on the cocycle. Our general results derived in [9] regarding the continuity properties of the Lyapunov exponents (LE) and of the Oseledets filtration and decompositions are then applicable, and we obtain local weak-Holder continuity of these quantities in the presence of gaps in the Lyapunov spectrum. The main new feature of this work is allowing a cocycle depending on several variables to have singularities, i.e. points of non invertibility. This requires a careful analysis of the set of zeros of certain analytic functions of several variables and of the singularities (i.e. negative infinity values) of pluri-subharmonic functions related to the iterates of the cocycle. A refinement of this method in the one variable case leads to a stronger LDT estimate and in turn to a stronger, nearly-Holder modulus of continuity of the LE, Oseledets filtration and Oseledets decomposition. This is a draft of a chapter in our forthcoming research monograph [9].

Keywords

Cite

@article{arxiv.1410.0909,
  title  = {Large deviations for quasi-periodic cocycles with singularities},
  author = {Pedro Duarte and Silvius Klein},
  journal= {arXiv preprint arXiv:1410.0909},
  year   = {2015}
}

Comments

42 pages

R2 v1 2026-06-22T06:12:40.395Z