Derivations of the Lie Algebras of Differential Operators
Abstract
This paper encloses a complete and explicit description of the derivations of the Lie algebra D(M) of all linear differential operators of a smooth manifold M, of its Lie subalgebra D1(M) of all linear first-order differential operators of M, and of the Poisson algebra S(M)=Pol(T*M) of all polynomial functions on T*M, the symbols of the operators in D(M). It turns out that, in terms of the Chevalley cohomology, H1(D(M),D(M))=H1DR(M), H1(D1(M),D1(M))=H1DR(M)2, and H1(S(M),S(M))=H1DR(M). The problem of distinguishing those derivations that generate one-parameter groups of automorphisms and describing these one-parameter groups is also solved.
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