On a conjecture of Wilf about the Frobenius number

Abstract

Given coprime positive integers a1 < ...< ad, the Frobenius number F is the largest integer which is not representable as a non-negative integer combination of the ai. Let g denote the number of all non-representable positive integers: Wilf conjectured that d ≥ F+1F+1-g. We prove that for every fixed value of a1d the conjecture holds for all values of a1 which are sufficiently large and are not divisible by a finite set of primes. We also propose a generalization in the context of one-dimensional local rings and a question on the equality d = F+1F+1-g.