Toroidal Compactifications and Stacky Cohomology of Mumford--Tate Domains

Abstract

Mumford--Tate domains parametrize polarized Hodge structures with fixed Mumford--Tate group and play a central role in the geometry of period maps. Their degenerations are governed by nilpotent orbits and limiting mixed Hodge structures, whose asymptotics are encoded in the logarithmic compactifications of Kato--Usui. In this paper we construct and study the log--toric Hodge stack \[ , := [D,/], \] obtained from a Mumford--Tate domain and a fan of nilpotent cones by forming the quotient of the Kato--Usui partial compactification D, by a neat arithmetic group ⊂ (). We show that , is a global quotient Deligne--Mumford stack, that it admits a natural logarithmic structure extending the period domain, and that near every boundary stratum associated to a cone σ∈ it admits a canonical analytic log--\'etale chart of the form \[ ([Fσ/Gσ]× σ), \] where Fσ is the space of nilpotent orbits modulo unipotent actions, Gσ is a finite symmetry group of the associated limiting mixed Hodge structures, and σ is a toric Deligne--Mumford stack refining the toric variety Dσ attached to σ. This decomposition cleanly separates Hodge-theoretic information from the combinatorial and stacky boundary data.