Mathematics – Differential Geometry
Scientific paper
1999-10-05
Mathematics
Differential Geometry
Scientific paper
For any closed complex manifold $X$, we calculate the Poincar\'{e} and Hodge polynomials of the delocalized equivariant cohomology $H^*(X^n, S_n)$ with a grading specified by physicists. As a consequence, we recover a special case of a formula for the elliptic genera of symmetric products in Dijkgraaf-Moore-Verlinde-Verlinde \cite{Dij-Moo-Ver-Ver}. For a projective surface X, our results matches with the corresponding formulas for the Hilbert scheme of X^[n]. We also give geometric construction of an action of a Heisenberg superalgebra on $\sum_{n \geq 0} H^{*,*}(X^n, S_n)$, imitating the constructions for equivariant K-theory by Segal \cite{Seg} and Wang \cite{Wan}. There is a corresponding version for $H^{-*, *}$.
Zhou Jian
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