Functional Correlation Bounds and Optimal Iterated Moment Bounds for Slowly-mixing Nonuniformly Hyperbolic Maps
Abstract
Consider a nonuniformly hyperbolic map T modelled by a Young tower with tails of the form O(n-β) , β>2 . We prove optimal moment bounds for Birkhoff sums Σi=0n-1v Ti and iterated sums Σ0 i<j<nv Ti\, w Tj , where v,w:M R are (dynamically) H\"older observables. Previously iterated moment bounds were only known for β>5. Our method of proof is as follows; (i) prove that T satisfies an abstract functional correlation bound, (ii) use a weak dependence argument to show that the functional correlation bound implies moment estimates. Such iterated moment bounds arise when using rough path theory to prove deterministic homogenisation results. Indeed, by a recent result of Chevyrev, Friz, Korepanov, Melbourne & Zhang we have convergence an It\o diffusion for fast-slow systems of the form \[ x(n)k+1=xk(n)+n-1a(xk(n),yk)+n-1/2b(xk(n),yk) , yk+1=T yk \] in the optimal range β>2.
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