Equivariant Euler characteristics of Mg, n

Abstract

Let Mg, n be the moduli space of n-pointed stable genus g curves, and let Mg, n be the moduli space of n-pointed smooth curves of genus g. In this paper, we obtain an asymptotic expansion for the characteristic of the free modular operad MV generated by a stable S-module V, allowing to effectively compute Sn-equivariant Euler characteristics of Mg, n in terms of Sn'-equivariant Euler characteristics of Mg'\!, n' with 0 g' g, max\0, 3 - 2g' \ n' 2(g - g') + n. This answers a question posed by Getzler and Kapranov by making their integral representation of the characteristic of the modular operad MV effective. To illustrate how the asymptotic expansion is used, we give formulas expressing the generating series of the Sn-equivariant Euler characteristics of Mg, n, for g = 0, 1 and 2, in terms of the corresponding generating series associated with Mg, n.