On the smallest numerical semigroups closed under affine maps

Abstract

We study numerical semigroups Sa,b(m) generated by the orbit of m under the affine map Ta,b(z)=az+b, where a 2, m>1, (b,m)=1, and b -(a-2)m-2. This extends the usual affine-closed setting to feasible negative values of b. We write Ai=(ai-1)/(a-1) and let n be the smallest positive integer such that An m. We determine the minimal generators and give an explicit description of the Apéry set, obtaining homogeneity and formulas for the Frobenius number and the genus. We also study pseudo-Frobenius numbers via the induced Apéry parametrization and prove the sharp upper bound t(Sa,b(m)) n-1 for the type. We give a complete characterization of the symmetric members of the family in terms of the canonical representative of m-1. Finally, we exhibit a subfamily whose pseudo-Frobenius numbers form an arithmetic progression of length n-1; in particular, this subfamily attains the bound.

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