On the spectrum of the number of geodesics and tight geodesics in the curve complex

Abstract

Let S be an oriented surface of type (g, n). We are interested in geodesics in the curve complex C(S) of S. In general, two 0-simplexes in C(S) have infinitely many geodesics connecting the two simplexes while another geodesics called tight geodesics are always finitely many. On the other hand, we may find two 0-simplexes in C(S) so that they have only finitely many geodesics between them. In this paper, we consider the spectrum of the number of geodesics with length d (≥ 2) in C(S) and tight geodesics, which is denoted by Spd(S) and SpdT(S), respectively. In our main theorem, it is shown that Spd(S) ⊂ SpdT(S) in general, but Sp2(S)= Sp2T(S). Moreover, we show that Sp2(S) and Sp2T(g, n) are completely determined in terms of (g, n).