Products of curves as ball quotients

Abstract

For any g1, g2 0, this paper shows that there is a cocompact lattice < PU(2,1) such that the ball quotient B2 is birational to a product C1 × C2 of smooth projective curves Cj of genus gj. The only prior examples were P1 × P1, due to Deligne--Mostow and rediscovered by many others, and a lesser-known product of elliptic curves whose existence follows from work of Hirzebruch. Combined with related new examples, this answers the rational variant of a question of Gromov in the positive for surfaces of Kodaira dimension 0, namely that they admit deformations V such that there is a compact ball quotient B2 with a rational map B2 V. Often the proof gives the stronger conclusion that V is birational to a ball quotient orbifold. It also follows that every simply connected 4-manifold is dominated by a complex hyperbolic manifold. All examples considered in this paper are shown to be arithmetic, and even arithmeticity of Hirzebruch's example appears to be new.

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