Bivariate trinomials over finite fields
Abstract
We study the number of points in the family of plane curves defined by a trinomial with fixed exponents (not collinear) and varying coefficients over finite fields. We prove that each of these curves has an almost predictable number of points, given by a closed formula that depends on the coefficients, exponents, and the field, with a small error term that is bounded in absolute value by , where is a constant that depends only on the exponents and the field. A formula for is provided, as well as a comparison of with the genus of the projective closure of the curve over . We also give several linear and quadratic identities for the numbers that are strong enough to prove the estimate above, and in some cases, to characterize them completely.
Cite
@article{arxiv.2102.10942,
title = {Bivariate trinomials over finite fields},
author = {Martin Avendano and Jorge Martin-Morales},
journal= {arXiv preprint arXiv:2102.10942},
year = {2021}
}
Comments
11 pages