Hopf cyclic cohomology and Hodge theory for proper actions on complex manifolds

Xin ZHANG

Front. Math. China ›› 2018, Vol. 13 ›› Issue (5) : 1189 -1214.

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Front. Math. China ›› 2018, Vol. 13 ›› Issue (5) : 1189 -1214. DOI: 10.1007/s11464-018-0727-7
RESEARCH ARTICLE
RESEARCH ARTICLE

Hopf cyclic cohomology and Hodge theory for proper actions on complex manifolds

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Abstract

We introduce two Hopf algebroids associated to a proper and holomorphic Lie group action on a complex manifold. We prove that the cyclic cohomology of each Hopf algebroid is equal to the Dolbeault cohomology of invariant differential forms. When the action is cocompact, we develop a generalized complex Hodge theory for the Dolbeault cohomology of invariant differential forms. We prove that every cyclic cohomology class of these two Hopf algebroids can be represented by a generalized harmonic form. This implies that the space of cyclic cohomology of each Hopf algebroid is finite dimensional. As an application of the techniques developed in this paper, we generalize the Serre duality and prove a Kodaira type vanishing theorem.

Keywords

Cyclic cohomology / complex Hodge theory / proper action / vanishing theorem

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Xin ZHANG. Hopf cyclic cohomology and Hodge theory for proper actions on complex manifolds. Front. Math. China, 2018, 13(5): 1189-1214 DOI:10.1007/s11464-018-0727-7

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