Distributions of weights and a question of Wilf

Abstract

Let S be a numerical semigroup of embedding dimension e and conductor c. The question of Wilf is, if \#( N S)/c≤ e-1/e. In (An asymptotic result concerning a question of Wilf, arXiv:1111.2779v1 [math.CO], 2011, Lemma 3), Zhai has shown an analogous inequality for the distribution of weights x·γ, x∈ Nd, w.\,r. to a positive weight vector γ: Let B⊂eq Nd be finite and the complement of an Nd-ideal. Denote by mean(B·γ) the average weight of B. Then \[mean(B·γ)/(B·γ)≤ d/d+1.\] For the family n:=\x∈ Nd|x·γ<n+1\ of such sets we are able to show, that mean(n·γ)/(n·γ) converges to d/d+1, as n goes to infinity. Applying Zhai's Lemma 3 to the Hilbert function of a positively graded Artinian algebra yields a new class of numerical semigroups satisfying Wilf's inequality.