Uniform distribution of subpolynomial functions along primes and applications
Abstract
Let H be a Hardy field (a field consisting of germs of real-valued functions at infinity that is closed under differentiation) and let f ∈ H be a subpolynomial function. Let P = \2, 3, 5, 7, … \ be the (naturally ordered) set of primes. We show that (f(n))n ∈ N is uniformly distributed mod 1 if and only if (f(p))p ∈ P is uniformly distributed mod 1. This result is then utilized to derive various ergodic and combinatorial statements which significantly generalize the results obtained in [BKMST].
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