On the number of numerical semigroups of prime power genus

Abstract

Given g 1, the number n(g) of numerical semigroups S ⊂ of genus | S| equal to g is the subject of challenging conjectures of Bras-Amor\'os. In this paper, we focus on the counting function n(g,2) of two-generator numerical semigroups of genus g, which is known to also count certain special factorizations of 2g. Further focusing on the case g=pk for any odd prime p and k 1, we show that n(pk,2) only depends on the class of p modulo a certain explicit modulus M(k). The main ingredient is a reduction of (pα+1, 2pβ+1) to a simpler form, using the continued fraction of α/β. We treat the case k=9 in detail and show explicitly how n(p9,2) depends on the class of p mod M(9)=3 · 5 · 11 · 17 · 43 · 257.