Citations:coisotropic


 * 2008 Florian Schaetz, "Invariance of the BFV-complex" arXiv
 * The BFV-complex was introduced to handle classical systems equipped with symmetries. One associates a differential graded Poisson algebra to any coisotropic submanifold $S$ of a smooth finite dimensional Poisson manifold $$(M,\Pi)$$.
 * 2009 Simone Gutt, Stefan Waldmann, "Involutions and Representations for Reduced Quantum Algebras" arXiv
 * We assume that $$*$$ is Hermitian and we show that the choice of a formal series of smooth densities on the embedded coisotropic submanifold $$C = J^{-1}(0)$$, with some equivariance property, defines a *-involution for $$*_{red}$$ on the reduced space.
 * 2010 Nikita Nekrasov, Edward Witten, "The Omega Deformation, Branes, Integrability, and Liouville Theory" arXiv
 * We use this reformulation together with the theory of coisotropic A-branes to explain recent results linking the Omega-deformation to integrable Hamiltonian systems in one direction and Liouville theory of two-dimensional conformal field theory in another direction.