Vanishing theorems on covering manifolds
Abstract
Let M be an oriented even-dimensional Riemannian manifold on which a discrete group of orientation-preserving isometries acts freely, so that the quotient X=M/ is compact. We prove a vanishing theorem for a half-kernel of a -invariant Dirac operator on a -equivariant Clifford module over M, twisted by a sufficiently large power of a -equivariant line bundle, whose curvature is non-degenerate at any point of M. This generalizes our previous vanishing theorems for Dirac operators on a compact manifold. In particular, if M is an almost complex manifold we prove a vanishing theorem for the half-kernel of a c Dirac operator, twisted by a line bundle with curvature of a mixed sign. In this case we also relax the assumption of non-degeneracy of the curvature. When M is a complex manifold our results imply analogues of Kodaira and Andreotti-Grauert vanishing theorems for covering manifolds. As another application, we show that semiclassically the c quantization of an almost complex covering manifold gives an "honest" Hilbert space. This generalizes a result of Borthwick and Uribe, who considered quantization of compact manifolds. Application of our results to homogeneous manifolds of a real semisimple Lie group leads to new proofs of Griffiths-Schmidt and Atiyah-Schmidt vanishing theorems.
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