Orbifold Uniformization of Complex Algebraic Variety via Polystable Parabolic Higgs Bundle

Abstract

Let \(X\) be a smooth complex projective variety of dimension \(n≥ 2\), and let \(D=Dp+Dc\), \(Dc=Σi Dic\), be a simple normal crossing divisor. We regard \(Dp\) as the cusp divisor and the components \(Dic\) as compact orbifold divisors with standard weights \(αi=1-1/pi\). Let \( X=X[[pi]Dic]i\) be the root stack along the compact components. We study the canonical parabolic Higgs bundle \(E*=(ΩX1( Dp) OX)*\), whose compact weights are the \(αi\) on the conormal lines of \(Dic\), while the parabolic structure along \(Dp\) is trivial. Assume that \((E*,θ)\) is polystable with respect to some ample line bundle and that equality holds in the parabolic Bogomolov--Gieseker inequality. We prove that the trace-free adjoint Higgs bundle is flat. The associated principal \(PU(n,1)\)-variation gives a faithful monodromy representation \(ρ:π1orb( Xo)(n,1)\) and a period map to the complex ball \( Bn\). The period map is unramified in the orbifold sense and identifies \(( X,Dp)\) with the canonical orbifold toroidal compactification \(( TΓ,DΓtor)\) of a finite-volume ball quotient, where \(Γ=ρ(π1orb( Xo))\) is a finite-volume lattice satisfying the regular log-root condition. We also formulate this standard-weight uniformization as an equivalence of categories: the compactified quotient construction and the monodromy construction define quasi-inverse functors between the regular log-root lattice category \(Latnreg\) and the standard Bogomolov--Gieseker category \(BGnstd\).