Quantization commutes with reduction for coisotropic A-branes
Abstract
On a Hamiltonian G-manifold X, we define the notion of G-invariance of coisotropic A-branes B. Under neat assumptions, we give a Marsden-Weinstein-Meyer type construction of a coisotropic A-brane Bred on X // G from B, recovering the usual construction when B is Lagrangian. For a canonical coisotropic A-brane Bcc on a holomorphic Hamiltonian GC-manifold X, there is a fibration of (Bcc)red over X // GC. We also show that `intersections of A-branes commute with reduction'. When X = T*M for M being compact Kähler with a Hamiltonian G-action, Guillemin-Sternberg `quantization commutes with reduction' theorem can be interpreted as HomX // G(Bred, (Bcc)red) HomX(B, Bcc)G with B = M.
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