Semialgebraic methods and generalized sum-product phenomena

Abstract

For a bivariate P(x,y) ∈ R[x,y] (R[x] R[y]), our first result shows that for all finite A ⊂eq R, |P(A,A)|≥ α|A|5/4 with α =α(deg P) ∈ R>0 unless P(x,y)=f(γ u(x)+δ u(y)) or P(x,y)=f(um(x)un(y)) for some univariate f, u ∈ R[t] R, constants γ, δ ∈ R≠ 0, and m, n∈ N≥ 1. This resolves the symmetric nonexpanders classification problem proposed by de Zeeuw. Our second and third results are sum-product type theorems for two polynomials, generalizing the classical result by Erdos and Szemer\'edi as well as a theorem by Shen. We also obtained similar results for C, and from this deduce results for fields of characteristic 0 and fields of large prime characteristic. The proofs of our results use tools from semialgebraic/o-minimal geometry.