Multidimensional Gaussian sums arising from distribution of Birkhoff sums in zero entropy dynamical systems
Abstract
A duality formula, of the Hardy and Littlewood type for multidimensional Gaussian sums, is proved in order to estimate the asymptotic long time behavior of distribution of Birkhoff sums Sn of a sequence generated by a skew product dynamical system on the T2 torus, with zero Lyapounov exponents. The sequence, taking the values 1, is pairwise independent (but not independent) ergodic sequence with infinite range dependence. The model corresponds to the motion of a particle on an infinite cylinder, hopping backward and forward along its axis, with a transversal acceleration parameter α. We show that when the parameter α /π is rational then all the moments of the normalized sums E((Sn/n)k), but the second, are unbounded with respect to n, while for irrational α /π, with bounded continuous fraction representation, all these moments are finite and bounded with respect to n.
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