Sumsets and monomial projective curves

Abstract

The aim of this note is to exploit a new relationship between additive combinatorics and the geometry of monomial projective curves. We associate to a finite set of non-negative integers A=\a1,·s, an\ a monomial projective curve CA⊂ Pn-1k such that the Hilbert function of CA and the cardinalities of sA:=\ai1+·s+ais 1 i1 ·s is n\ agree. The singularities of CA determines the asymptotic behaviour of |sA|, equivalently the Hilbert polynomial of CA, and the asymptotic structure of sA. We show that some additive inverse problems can be translate to the rigidity of Hilbert polynomials and we improve an upper bound of the Castelnuovo-Mumford regularity of monomial projective curves by using results of additive combinatorics.