Perturbed Polynomial Powers and Bourgain Entropy Obstructions for Khintchin Averages

Abstract

Let a2, let p∈Z[n] be eventually increasing and eventually non-negative, and let λn=ap(n)+f(n)>0, where f(n)∈Z. We prove, using Bourgain's bounded entropy criterion, that if (1+f(n)a-p(n)) is eventually non-zero and decays geometrically in absolute value, then (λn) is neither L∞-Khintchin nor L1-Khintchin. In particular, for every c∈Z\0\, every positive tail of (ap(n)+c)n1 is non-Khintchin. The same conclusion applies to the standard examples an+c, an+bn, and, whenever eventually positive, an-bn, with a≠ b. Thus these perturbations of geometric powers lie on the unstable side of the Khintchin problem. This gives a negative answer, in the translated-power case, to the question of Fan--Fan--Queffélec--Queffélec on the stability of translated powers.