The covariety of perfect numerical semigroups with fixed Frobenius number

Abstract

Let S be a numerical semigroup. We will say that h∈ N S is an isolated gap of S if \h-1,h+1\⊂eq S. A numerical semigroup without isolated gaps is called perfect numerical semigroup. Denote by m(S) the multiplicity of a numerical semigroup S. A covariety is a nonempty family C of numerical semigroups that fulfills the following conditions: there is the minimum of C, the intersection of two elements of C is again an element of C and S \ m(S)\∈ C for all S∈ C such that S≠ (C). In this work we prove that the set P(F)=\S S is a perfect numerical\ semigroup with Frobenius number F\ is a covariety. Also, we describe three algorithms which compute: the set P(F), the maximal elements of P(F) and the elements of P(F) with a given genus. A Parf-semigroup (respectively, Psat-semigroup) is a perfect numerical semigroup that in addition is an Arf numerical semigroup (respectively, saturated numerical semigroup). We will prove that the sets: Parf(F)=\S S is a Parf-numerical semigroup with Frobenius number F\ and Psat(F)=\S S is a Psat-numerical semigroup with Frobenius number F\ are covarieties. As a consequence we present some algorithms to compute Parf(F) and Psat(F).