An asymmetric version of Elekes-Szab\'o via group actions

Abstract

We consider when finite families F ⊂eq C[t] of bounded degree polynomials, or more generally of bounded complexity finite-to-finite correspondences on C, can exhibit non-expansion of the form |F(A)| = O(|A|1+η) in their actions on finite sets A ⊂eq C with |F| |A| 1, for a fixed >0 and arbitrarily small η>0. Our conclusions generalise the Elekes-R\'onyai and Elekes-Szab\'o theorems, which correspond to the case that F is parametrised by a single complex variable and |F|=|A|. Our result also applies to families of correspondences between varieties of arbitrary dimension if we impose a general position assumption on A. In all cases, the conclusion is that a commutative algebraic group structure is responsible. As a special case, we obtain asymmetric versions of Elekes-R\'onyai and Elekes-Szab\'o, with explicit bounds on exponents. Our methods originate in model theory.