On Pursell-Shanks type results

Abstract

We prove a Lie-algebraic characterization of vector bundle for the Lie algebra D(E,M), seen as C∞(M)-module, of all linear operators acting on sections of a vector bundle E M. We obtain similar result for its Lie subalgebra D1(E,M) of all linear first-order differential operators. Thanks to a well-chosen filtration, D(E,M) becomes P(E,M) and we prove that P1(E,M) characterizes the vector bundle without the hypothesis of being seen as C∞(M)-module. We prove that the Lie algebra S(P(E,M)) of symbols of linear operators acting on smooth sections of a vector bundle E M, characterizes it. To obtain this, we assume that S(P(E,M)) is seen as C∞(M)-module. We obtain a similar result with the Lie algebra S1(P(E,M)) of symbols of first-order linear operators without the hypothesis of being seen as a C∞(M)-module.