Bohr obstructions to recurrence along Hardy-field sequences

Abstract

We construct Bohr obstructions to multiple recurrence along rounded Hardy-field sequences, showing that the real derivative-span criterion of Bergelson, Moreira, and Richter is essentially sharp and answering two of their questions. For E⊂eq N and u: N Z, set Ru(E):=\n∈ N:E(E-u(n))≠\. We prove that, if f1,…,fk are functions of polynomial growth from a Hardy field and some real linear combination of f1,…,fk and their derivatives has a nonzero finite limit, then there exist M∈ N and a basic Bohr set E⊂eq N such that i=1k R[Mfi](E) is not thick. In particular, for some Bohr set E, the set R[t3/2](E) R[2t3/2+t](E) is piecewise syndetic but not thick. We also prove that, if for some λ1,…,λk∈R we have ∈fx≥ 1\|Σiλifi(x)\|T>12 Σi|λi|, then i R[fi](E)= for some basic Bohr set E. More generally, our results apply with [·] replaced by any rounding function ρ:R satisfying x∈R|ρ(x)-x|<∞.