Heat kernel and local index theorem for open complex manifolds with C -action
Abstract
For a complex manifold with C -action, we define the m-th C Fourier-Dolbeault cohomology group and consider the m-index on . By applying the method of transversal heat kernel asymptotics, we obtain a local index formula for the m-index. We can reinterpret Kawasaki's Hirzebruch-Riemann-Roch formula for a compact complex orbifold with an orbifold holomorphic line bundle by our integral formulas over a (smooth) complex manifold and finitely many complex submanifolds arising from singular strata. We generalize C -action to complex reductive Lie group G-action on a compact or noncompact complex manifold. Among others, we study the nonextendability of open group action and the space of all G-invariant holomorphic p-forms. Finally, in the case of two compatible holomorphic C -actions, a mirror-type isomorphism is found between two linear spaces of holomorphic forms, and the Euler characteristic associated with these spaces can be computed by our C local index formula on the total space. In the perspective of the equivariant algebraic cobordism theory C ( ), a speculative connection is remarked. Possible relevance to the recent development in physics and number theory is briefly mentioned.
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