Non-abelian cohomology of Lie H-pseudoalgebras and inducibility of automorphisms
Abstract
The notion of Lie H-pseudoalgebra is a higher-dimensional analogue of Lie conformal algebras. In this paper, we classify the equivalence classes of non-abelian extensions of a Lie H-pseudoalgebra L by another Lie H-pseudoalgebra M in terms of the non-abelian cohomology group H2nab (L, M). We also show that the group H2nab (L, M) can be realized as the Deligne groupoid of a suitable differential graded Lie algebra. Finally, we consider the inducibility of a pair of Lie H-pseudoalgebra automorphisms in a given non-abelian extension. We show that the corresponding obstruction can be realized as the image of a suitable Wells map in the context.
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