Partition of complement of good ideals and Ap\'ery sets

Abstract

Good semigroups form a class of submonoids of Nd containing the value semigroups of curve singularities. In this article, we describe a partition of the complements of good semigroup ideals, having as main application the description of the Ap\'ery sets of good semigroups. This generalizes to any d ≥ 2 the results of a recent paper of D'Anna, Guerrieri and Micale, which are proved in the case d=2 and only for the standard Ap\'ery set with respect to the smallest nonzero element. Several new results describing good semigroups in Nd are also provided.