Primary spectrum of C∞(M) and jets theory

Abstract

We consider, for each smooth manifold M, the set M comprised by all the primary ideals of C∞(M) which are closed and whose radical is maximal. The classical Lie theory of jets (jets of submanifolds) must be extended to M in order to have nice functorial properties. We will begin with the purely algebraic notions, referred always to the ring C∞(M). Subsequently it will be introduced the differentiable structures on each jets space of a given type. The theory of contact systems, which generalizes the classical one, has a part purely algebraic and another one which depends on the differentiable structures.