Structure of multicorrelation sequences with integer part polynomial iterates along primes

Abstract

Let T be a measure preserving Z-action on the probability space (X, B,μ), q1,…,qm: R R vector polynomials, and f0,…,fm∈ L∞(X). For any ε > 0 and multicorrelation sequences of the form α(n)=∫Xf0· T q1(n) f1·s T qm(n) fm\;dμ we show that there exists a nilsequence for which N - M ∞ 1N-M Σn=MN-1 |α(n) - (n)| ≤ ε and N ∞ 1π(N) Σp ∈ P[1,N] |α(p) - (p)| ≤ ε. This result simultaneously generalizes previous results of Frantzikinakis [2] and the authors [11,13].