Cohomologie de Chevalley des graphes vectoriels

Abstract

The space of smotth functions and vector fields on d is a Lie subalgebra of the (graded) Lie algebra T\poly(d), equipped with the Scouten bracket. In this paper, we compute the cohomology of this subalgebra for the adjoint representation in T\poly(d), restricting ourselves to the case of cochains defined with purely aerial Kontsevich's graphs, as in [AGM]. We find results which are very similar to the classical Gelfand-Fuchs and de Wilde-Lecomte one.

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