The set of Arf numerical semigroups with given Frobenius number

Abstract

In this work we will show that if F is a positive integer, then the set Arf(F)=\S S is an Arf numerical semigroup with Frobenius number F\ verifies the following conditions: 1) (F)=\0,F+1,→\ is the minimum of Arf(F), 2) if \S, T\ ⊂eq Arf(F), then S T ∈ Arf(F), 3) if S ∈ Arf(F), S≠ (F) and m(S)= (S \0\), then S \ m(S)\ ∈ Arf(F). The previous results will be used to give an algorithm which calculates the set Arf(F). Also we will see that if X⊂eq S (F) for some S∈ Arf(F), then there is the smallest element of Arf(F) containing X.