Sumsets and entropy revisited

Abstract

The entropic doubling σent[X] of a random variable X taking values in an abelian group G is a variant of the notion of the doubling constant σ[A] of a finite subset A of G, but it enjoys somewhat better properties; for instance, it contracts upon applying a homomorphism. In this paper we develop further the theory of entropic doubling and give various applications, including: (1) A new proof of a result of Pálvölgyi and Zhelezov on the ``skew dimension'' of subsets of ZD with small doubling; (2) A new proof, and an improvement, of a result of the second author on the dimension of subsets of ZD with small doubling; (3) A proof that the Polynomial Freiman--Ruzsa conjecture over F2 implies the (weak) Polynomial Freiman--Ruzsa conjecture over Z.