Sets of large values of polynomial multi-correlation functions

Abstract

Let p1,...,pL∈ Z[x1,...,xd] be non-constant polynomials with zero constant term. The ergodic theoretical proofs of the polynomial and the IP-polynomial Szemeredi theorems as well as some of the ergodic-theoretical and combinatorial consequences of the Density Polynomial Hales-Jewett conjecture (DPHJ) naturally lead to the study of sets of large returns which are defined as Rεp1,...,pL(A):=\n∈ Zd\,|\,μ(A T1-p1( n)A·s TL-pL(n)A)>μL+1(A)-ε\, where the Tj's are commuting and invertible μ-preserving transformations, A is measurable, and ε>0. We obtain new results dealing with the sets of the form Rεp1,...,pL(A). Among other things, we show that every set of the form Rεp1,...,pL(A) is syndetic if and only if p1,...,pL are linearly independent, answering a question asked by Frantzikinakis-Kuca. Moreover, the linear independence of p1,...,pL implies that every set of the form Rεp1,...,pL(A) has the A-IP* property (="almost" IP* property), which is stronger than syndeticity. The following is one of the new combinatorial results obtained in this paper. Suppose that p1,...,pL are linearly independent. For any set E⊂eq ZD with upper Banach density d*(E)>0, any non-zero v1,..., vL∈ ZD, and any ε>0, the set Sεp1,...,pL(E):=\ n∈ Zd\,|\,d*(E (E-p1(n)v1) ·s (E-pL(n)vL))>(d*(E))L+1-ε\ is A-IP*. Furthermore, we prove that when D>L>1, this result is sharp: the A-IP* property cannot be upgraded to IP*. The techniques developed in this paper lead to some additional applications. For example, we show that an amplified form of the IP-polynomial Szemeredi theorem conjectured by Bergelson- McCutcheon follows from the DPHJ.