A sequence of quasipolynomials arising from random numerical semigroups
Abstract
A numerical semigroup is a subset of the non-negative integers that is closed under addition. For a randomly generated numerical semigroup, the expected number of minimum generators can be expressed in terms of a doubly-indexed sequence of integers, denoted hn, i, that count generating sets with certain properties. We prove a recurrence that implies the sequence hn,i is eventually quasipolynomial when the second parameter is fixed.
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