p-numerical semigroups of Pell triples

Abstract

For a nonnegative integer p, the p-numerical semigroup Sp is defined as the set of integers whose nonnegative integral linear combinations of given positive integers a1,a2,…,a with (a1,a2,…,a)=1 are expressed in more than p ways. When p=0, S=S0 is the original numerical semigroup. The largest element and the cardinality of N0 Sp are called the p-Frobenius number and the p-genus, respectively. Their explicit formulas are known for =2, but those for 3 have been found only in some special cases. For some known cases, such as the Fibonacci and the Jacobsthal triplets, similar techniques could be applied and explicit formulas such as the p-Frobenius number could be found. In this paper, we give explicit formulas for the p-Frobenius number and the p-genus of Pell numerical semigroups (Pi(u),Pi+2(u),Pi+k(u)). Here, for a given positive integer u, Pell-type numbers Pn(u) satisfy the recurrence relation Pn(u)=u Pn-1(u)+Pn-2(u) (n 2) with P0(u)=0 and P1(u)=1. The p-Ap\'ery set is used to find the formulas, but it shows a different pattern from those in the known results, and some case by case discussions are necessary.