When is a numerical semigroup a quotient?

Abstract

A natural operation on numerical semigroups is taking a quotient by a positive integer. If S is a quotient of a numerical semigroup with k generators, we call S a k-quotient. We give a necessary condition for a given numerical semigroup S to be a k-quotient, and present, for each k 3, the first known family of numerical semigroups that cannot be written as a k-quotient. We also examine the probability that a randomly selected numerical semigroup with k generators is a k-quotient.

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