The perfect cone compactification of quotients of type IV domains
Abstract
The perfect cone compactification is a toroidal compactification which can be defined for locally symmetric varieties. Let DL/O+(L)p be the perfect cone compactification of the quotient of the type IV domain DL associated to an even lattice L. In our main theorem we show that the pair (DL/O+(L)p, /2) has klt singularities, where is the closure of the branch divisor of DL/O+(L) . In particular this applies to the perfect cone compactification of the moduli space of 2d-polarised K3 surfaces with ADE singularities when d is square-free.
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