Almost-Everywhere Convergence and Polynomials

Abstract

Denote by the set of pointwise good sequences. Those are sequences of real numbers (ak) such that for any measure preserving flow (Ut)t∈ R on a probability space and for any f∈ L∞, the averages 1n Σk=1n f(Uakx) converge almost everywhere. We prove the following two results. [1.] If f: (0,∞) R is continuous and if (f(ku+v))k≥ 1∈ for all u, v>0, then f is a polynomial on some subinterval J⊂ (0,∞) of positive length. [2.] If f: [0,∞) R is real analytic and if (f(ku))k≥ 1∈ for all u>0, then f is a polynomial on the whole domain [0,∞). These results can be viewed as converses of Bourgain's polynomial ergodic theorem which claims that every polynomial sequence lies in .