The Kodaira dimension of even-dimensional ball quotients
Abstract
We prove that, up to scaling, there exist only finitely many isometry classes of Hermitian lattices over OE of signature (1,n) that admit ball quotients of non-general type, where n>12 is even and E=Q(-D) for an odd discriminant -D<-3. Furthermore, we show that even-dimensional ball quotients, associated with arithmetic subgroups of U(1,n) defined over E, are always of general type if n > 207, or n>12 and D>2557. To establish these results, we construct a nontrivial full-level cusp form of weight n on the n-dimensional complex ball. A key ingredient in our proof is the use of Arthur's multiplicity formula from the theory of automorphic representations.
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