Stability in the homology of Deligne-Mumford compactifications

Abstract

Using the the theory of FSop modules, we study the asymptotic behavior of the homology of Mg,n, the Deligne--Mumford compactification of the moduli space of curves, for n >> 0. An FSop module is a contravariant functor from the category of finite sets and surjections to vector spaces. Via maps that glue on marked P1's, we give the homology of Mg,n the structure of an FSop module and bound its degree of generation. As a consequence, we prove that the generating function Σn (Hi( Mg,n)) tn is rational, and its denominator has roots in the set \1, 1/2, …, 1/p(g,i)\ where p(g,i) is a polynomial of order O(g2 i2). We also obtain restrictions on the decomposition of the homology of Mg,n into irreducible Sn representations.