English

On three-variable expanders over finite valuation rings

Combinatorics 2020-07-16 v2

Abstract

Let R\mathcal{R} be a finite valuation ring of order qrq^r. In this paper, we prove that for any quadratic polynomial f(x,y,z)R[x,y,z]f(x,y,z) \in \mathcal{R}[x,y,z] that is of the form axy+R(x)+S(y)+T(z)axy+R(x)+S(y)+T(z) for some one-variable polynomials R,S,TR, S , T, we have f(A,B,C)min{qr,ABCq2r1} |f(A,B,C)| \gg \min\left\{ q^r, \frac{|A||B||C|}{q^{2r-1}}\right\} for any A,B,CRA, B, C \subset \mathcal{R}. We also study the sum-product type problems over finite valuation ring R.\mathcal{R}. More precisely, we show that for any ARA \subset \mathcal{R} with Aqr1/3|A| \gg q^{r-1/3} then max{AA,Ad+Ad},max{A+A,A2+A2},max{AA,AA+AA}A2/3qr/3,\max\{ |A \cdot A|, |A^d + A^d|\},\max\{ |A + A|, |A^2 + A^2|\},\max\{|A-A|,|AA+AA|\} \gg |A|^{2/3}q^{r/3}, and f(A)+AA2/3qr/3|f(A) + A| \gg |A|^{2/3}q^{r/3} for any one variable quadratic polynomial ff.

Keywords

Cite

@article{arxiv.2007.05251,
  title  = {On three-variable expanders over finite valuation rings},
  author = {Nguyen Van The and Phuc D Tran and Le Quang Ham and Le Anh Vinh},
  journal= {arXiv preprint arXiv:2007.05251},
  year   = {2020}
}

Comments

Theorem 1.6 is cited because it has already proved

R2 v1 2026-06-23T17:00:41.870Z