Semispecial tensors and quotients of the polydisc
Abstract
Let X be a complex-projective variety with klt singularities and ample canonical divisor. We prove that X is a quotient of the polydisc by a group acting properly discontinuously and freely in codimension one if and only if X admits a semispecial tensor with reduced hypersurface. This extends a result of Catanese and Di Scala to singular spaces, and answers a question raised by these authors. As a key step in the proof, we establish the Bochner principle for holomorphic tensors on klt spaces in the negative K\"ahler--Einstein case.
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