Ordinarization numbers of numerical semigroups

Abstract

There has been significant recent interest in studying how the number of numerical semigroups of genus g behaves as a function of g. Bras-Amor\'os has shown how to organize the collection of numerical semigroups of genus g into a rooted tree called the ordinarization tree. The ordinarization number of a numerical semigroup S is the length of the path from S back to the root of the tree. We study the problem of counting numerical semigroups of genus g with a fixed ordinarization number r. We show how this can be interpreted as a counting problem about integer points in a certain rational polyhedral cone and use ideas from Ehrhart theory to study this problem. We give a formula for the number of numerical semigroups of genus g and ordinarization number 2, building on the corresponding result of Bras-Amor\'os for ordinarization number 1. We show that the ordinarization number of a numerical semigroup generated by two elements is equal to the number of integer points in a certain right triangle with rational vertices. We consider the analogous problem for supersymmetric numerical semigroups with more generators. We also study ordinarization numbers of numerical semigroups generated by an interval.