Symplectic Surgery and the Spin-C Dirac operator

Abstract

Let G be a compact connected Lie group, and M a compact Hamiltonian G-space, with moment map J. For each G-equivariant Hermitian vector bundle E over M, one has an associated twisted Spin-C Dirac operator, whose equivariant index is a symplectic invariant of E. In the present paper, we study gluing properties of the equivariant index under "symplectic cutting" operations. Our main application is a proof of the Guillemin-Sternberg conjecture, which says that if E=L is a quantizing line bundle and 0 a regular value of J, the multiplicity of the trivial representation in the equivariant index is equal to the Riemann-Roch number of the symplectic quotient. This generalizes previous results for the case that G=T is abelian.

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