Bounds for invariants of numerical semigroups and Wilf's Conjecture

Abstract

Given coprime positive integers g1 < … < ge, the Frobenius number F=F(g1,…,ge) is the largest integer not representable as a linear combination of g1,…,ge with non-negative integer coefficients. Let n denote the number of all representable non-negative integers less than F; Wilf conjectured that F+1 e n. We provide bounds for g1 and for the type of the numerical semigroup S= g1,…,ge in function of e and n, and use these bounds to prove that F+1 q e n, where q= F+1g1 , and F+1 e n2. Finally, we give an alternative, simpler proof for the Wilf conjecture if the numerical semigroup S= g1,…,ge is almost-symmetric.