On a Poisson-algebraic characterization of vector bundles

Abstract

We prove that the R-algebra S(P(E,M)) of symbols of differential operators acting on the sections of the vector bundle E M decompose into the sum \[ S(P(E,M))=J(E) Pol(T*M) \] where J(E) is an ideal of S(P(E,M)) in which product of two elements is always zero. This induces that S(P(E,M)) cannot characterize E M with its only structure of R- algebra. We prove that with its Poisson algebra structure, S(P(E,M)) characterizes the vector bundle E M without the requirement to be considered as a C∞(M)-module.