Generalizations of Furstenberg's Diophantine result

Abstract

We prove two generalizations of Furstenberg's Diophantine result regarding density of an orbit of an irrational point in the one-torus under the action of multiplication by a non-lacunary multiplicative semi-group of N. We show that for any sequences \an \,\bn \⊂Z for which the quotients of successive elements tend to 1 as n goes to infinity, and any infinite sequence \cn \, the set \anbmckx : n,m,k∈N \ is dense modulo 1 for every irrational x. Moreover, by ergodic-theoretical methods, we prove that if \an \,\bn \ are sequence having smooth p-adic interpolation for some prime number p, then for every irrational x, the sequence \pnambkx : n,m,k∈N \ is dense modulo 1.