Modular Frobenius pseudo-varieties

Abstract

If m ∈ N and A is a finite subset of k ∈ N \0,1\ \1,…,m-1\k, then we denote by align* C(m,A) = \S∈ Sm s1+·s+sk-m ∈ S if (s1,…,sk)∈ Sk and . \\ .(s1 m, …, sk m)∈ A \. align* In this work we prove that C(m,A) is a Frobenius pseudo-variety. We also show algorithms that allows us to establish whether a numerical semigroup belongs to C(m,A) and to compute all the elements of C(m,A) with a fixed genus. Moreover, we introduce and study three families of numerical semigroups, called of second-level, thin and strong, and corresponding to C(m,A) when A=\1,…,m-1\3, A=\(1,1),…,(m-1,m-1)\, and A=\1,…,m-1\2 \(1,1),…,(m-1,m-1)\, respectively.

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