Scheme-theoretic coisotropic reduction

Abstract

We develop an affine scheme-theoretic version of Hamiltonian reduction by symplectic groupoids. It works over =R or =C, and is formulated for an affine symplectic groupoid G X, an affine Hamiltonian G-scheme μ:M X, a coisotropic subvariety S⊂eq X, and a stabilizer subgroupoid H S. Our first main result is that the Poisson bracket on [M] induces a Poisson bracket on the subquotient [μ-1(S)]H. The Poisson scheme Spec([μ-1(S)]H) is then declared to be a Hamiltonian reduction of M. Other main results include sufficient conditions for Spec([μ-1(S)]H) to inherit a residual Hamiltonian scheme structure. Our main results are best viewed as affine scheme-theoretic counterparts to an earlier paper, where we simultaneously generalize several Hamiltonian reduction processes. In this way, the present work yields scheme-theoretic analogues of Marsden-Ratiu reduction, Mikami-Weinstein reduction, \'Sniatycki-Weinstein reduction, and symplectic reduction along general coisotropic submanifolds. The initial impetus for this work was its utility in formulating and proving generalizations of the Moore-Tachikawa conjecture.