Abstract
Using the theory of
${\mathbf {FS}} {^\mathrm {op}}$
modules, we study the asymptotic behavior of the homology of
${\overline {\mathcal {M}}_{g,n}}$
, the Deligne–Mumford compactification of the moduli space of curves, for
$n\gg 0$
. An
${\mathbf {FS}} {^\mathrm {op}}$
module is a contravariant functor from the category of finite sets and surjections to vector spaces. Via copies that glue on marked projective lines, we give the homology of
${\overline {\mathcal {M}}_{g,n}}$
the structure of an
${\mathbf {FS}} {^\mathrm {op}}$
module and bound its degree of generation. As a consequence, we prove that the generating function
$\sum _{n} \dim (H_i({\overline {\mathcal {M}}_{g,n}})) t^n$
is rational, and its denominator has roots in the set
$\{1, 1/2, \ldots, 1/p(g,i)\},$
where
$p(g,i)$
is a polynomial of order
$O(g^2 i^2)$
. We also obtain restrictions on the decomposition of the homology of
${\overline {\mathcal {M}}_{g,n}}$
into irreducible
$\mathbf {S}_n$
representations.
Stability in the homology of Deligne–Mumford compactifications
