Constructs topological elliptic genera as G-equivariant refinements of classical elliptic genera and derives a divisibility result for Euler numbers of Sp-manifolds.
Elliptic genus of Calabi-Yau manifolds and Jacobi and Siegel modular forms
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abstract
In the paper we study two types of relations: a one is between the elliptic genus of Calabi-Yau manifolds and Jacobi modular forms, another one is between the second quantized elliptic genus, Siegel modular forms and Lorentzian Kac-Moody Lie algebras. We also determine the structure of the graded ring of the weak Jacobi forms with integral Fourier coefficients. It gives us a number of applications to the theory of elliptic genus and of the second quantized elliptic genus.
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Topological Elliptic Genera I -- The mathematical foundation
Constructs topological elliptic genera as G-equivariant refinements of classical elliptic genera and derives a divisibility result for Euler numbers of Sp-manifolds.