Jean-Pierre Conze, Stefano Isola, Stéphane Le Borgne
Published 2017-05-30Version 1
For a rotation by an irrational $\alpha$ on the circle and a BV function $\varphi$, we study the variance of the ergodic sums $S_L \varphi(x) := \sum_{j=0}^{L -1} \, \varphi(x + j\alpha)$. When $\alpha$ is not of constant type, we construct sequences $(L_N)$ such that, at some scale, the ergodic sums $S_{L_N} \varphi$ satisfy an ASIP. Explicit non-degenerate examples are given, with an application to the rectangular periodic billiard in the plane.
Proving ergodicity via divergence of ergodic sums
Fluctuations of ergodic sums on periodic orbits under specification
Logarithmic bounds for ergodic sums of certain flows on the torus: a short proof
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