English

Addition Theorems in Fp via the Polynomial Method

Combinatorics 2017-02-22 v1 Number Theory

Abstract

In this article, we use the Combinatorial Nullstellensatz to give new proofs of the Cauchy-Davenport, the Dias da Silva-Hamidoune and to generalize a previous addition theorem of the author. Precisely, this last result proves that for a set A \subset Fp such that A \cap (--A) = \emptyset the cardinality of the set of subsums of at least α\alpha pairwise distinct elements of A is: |Σ\Sigmaα\alpha(A)| \ge min (p, |A|(|A| + 1)/2 -- α\alpha(α\alpha + 1)/2 + 1) , the only cases previously known were α\alpha \in {0, 1}. The Combinatorial Nullstellensatz is used, for the first time, in a direct and in a reverse way. The direct (and usual) way states that if some coefficient of a polynomial is non zero then there is a solution or a contradiction. The reverse way relies on the coefficient formula (equivalent to the Combinatorial Nullstellensatz). This formula gives an expression for the coefficient as a sum over any cartesian product. For these three addition theorems, some arithmetical progressions (that reach the bounds) will allow to consider cartesian products such that the coefficient formula is a sum all of whose terms are zero but exactly one. Thus we can conclude the proofs without computing the appropriate coefficients.

Cite

@article{arxiv.1702.06419,
  title  = {Addition Theorems in Fp via the Polynomial Method},
  author = {Eric Balandraud},
  journal= {arXiv preprint arXiv:1702.06419},
  year   = {2017}
}
R2 v1 2026-06-22T18:24:13.125Z