English

Points on curves in small boxes en applications

Number Theory 2012-03-28 v3

Abstract

We introduce several new methods to obtain upper bounds on the number of solutions of the congruences f(x)y(modp)f(x) \equiv y \pmod p and f(x)y2(modp),f(x) \equiv y^2 \pmod p, with a prime pp and a polynomial ff, where (x,y)(x,y) belongs to an arbitrary square with side length MM. We use these results and methods to derive non-trivial upper bounds for the number of hyperelliptic curves Y2=X2g+1+a2g1X2g1+...+a1X+a0Y^2=X^{2g+1} + a_{2g-1}X^{2g-1} +...+ a_1X+a_0 over the finite field \Fp\F_p of pp elements, with coefficients in a 2g2g-dimensional cube (a0,...,a2g1)[R0+1,R0+M]×...×[R2g1+1,R2g1+M] (a_0,..., a_{2g-1})\in [R_0+1,R_0+M]\times...\times [R_{2g-1}+1,R_{2g-1}+M] that are isomorphic to a given curve and give an almost sharp lower bound on the number of non-isomorphic hyperelliptic curves with coefficients in that cube. Furthermore, we study the size of the smallest box that contain a partial trajectory of a polynomial dynamical system over \Fp\F_p.

Keywords

Cite

@article{arxiv.1111.1543,
  title  = {Points on curves in small boxes en applications},
  author = {Mei-Chu Chang and Javier Cilleruelo and Moubariz Z. Garaev and José Hernández and Igor E. Shparlinski and Ana Zumalacárregui},
  journal= {arXiv preprint arXiv:1111.1543},
  year   = {2012}
}

Comments

33 pages. Revised version, Theorem 2 was improved

R2 v1 2026-06-21T19:31:56.004Z