The p-numerical semigroup of the triple of arithmetic progressions

Abstract

For given positive integers a1,a2,…,ak with (a1,a2,…,ak)=1, the denumerant d(n)=d(n;a1,a2,…,ak) is the number of nonnegative solutions (x1,x2,…,xk) of the linear equation a1 x1+a2 x2+…+ak xk=n for a positive integer n. For a given nonnegative integer p, let Sp=Sp(a1,a2,…,ak) be the set of all nonnegative integers n's such that d(n)>p. In this paper, we are interested in the p-Frobenius number, which is the maximum of the set of gaps N0 Sp. Here N0 denotes the set of nonnegative integers. When p=0, S=S0 is the original numerical semigroup, and the 0-Frobenius number is the original Frobenius number. The explicit formula for two variables is known not only for p=0 but also for p>0, but when there are three or more variables, it is difficult even in the special case of p=0. For p>0, it is not only more difficult, but no explicit formula had been found. In this paper, explicit formulas of the p-Frobenius number and related values are given for the triple of arithmetic progressions. The main tool is to determine the elements of the p-Ap\'ery set.