Cosimplicial meromorphic functions cohomology on complex manifolds
Abstract
Developing ideas of Fei, we introduce canonical cosimplicial cohomology of meromorphic functions for infinite-dimensional Lie algebra formal series with prescribed analytic behavior on domains of a complex manifold M. Graded differential cohomology of a sheaf of Lie algebras G via the cosimplicial cohomology of G-formal series for any covering by Stein spaces on M is computed. A relation between cosimplicial cohomology (on a special set of open domains of M) of formal series of an infinite-dimensional Lie algebra G and singular cohomology of auxiliary manifold associated to a G-module is found. Finally, multiple applications in conformal field theory, deformation theory, and in the theory of foliations are proposed.
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