Density of orbits of horocycle flows at sub-quadratic polynomial times
Abstract
Let ⊂ PSL(2,R) be such that the space X= PSL(2,R) is not compact. Let (ht) be the horocycle flow acting on X. We show that for every x∈ X that is not periodic for (ht) and for every δ∈ (0,1) the orbit \hn2-δx\n∈ N is dense in X. Assuming additionally the Hardy-Littlewood conjecture we show that for every non-periodic x∈ X, \hpx\p- prime is dense in X. Finally we show that for =PSL(2,Z), \hn2yq\n<q equidistribute, as q ∞ along primes congruent to 1 4, towards Haar measure, where \yq\ is a sequence of periodic points of period q.
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