p-numerical semigroups with p-symmetric properties

Abstract

The so-called Frobenius number in the famous linear Diophantine problem of Frobenius is the largest integer such that the linear equation a1 x1+·s+ak xk=n (a1,…,ak are given positive integers with (a1,…,ak)=1) does not have a non-negative integer solution (x1,…,xk). The generalized Frobenius number (called the p-Frobenius number) is the largest integer such that this linear equation has at most p solutions. That is, when p=0, the 0-Frobenius number is the original Frobenius number. In this paper, we introduce and discuss p-numerical semigroups by developing a generalization of the theory of numerical semigroups based on this flow of the number of representations. That is, for a certain non-negative integer p, p-gaps, p-symmetric semigroups, p-pseudo-symmetric semigroups, and the like are defined, and their properties are obtained. When p=0, they correspond to the original gaps, symmetric semigroups, and pseudo-symmetric semigroups, respectively.

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