Jet Functors in Noncommutative Geometry

Abstract

In this article we construct three infinite families of endofunctors Jd(n), Jd[n], and Jdn on the category of left A-modules, where A is a unital associative algebra over a commutative ring k, equipped with an exterior algebra d. We prove that these functors generalize the corresponding classical notions of nonholonomic, semiholonomic, and holonomic jet functors, respectively. Our functors come equipped with natural transformations from the identity functor to the corresponding jet functors, which play the r\oles of the classical prolongation maps. This allows us to define the notion of linear differential operators with respect to d. We show that if 1d is flat as a right A-module, the semiholonomic jet functor satisfies the semiholonomic jet exact sequence 0 → nA 1d → J[n]d→ J[n-1]d → 0. Moreover, we construct a functor of symmetric (in a suitable noncommutative sense) forms Snd associated to d, and proceed to introduce the corresponding noncommutative analogue of the Spencer δ-complex. We give necessary and sufficient conditions under which the holonomic jet functor Jdn satisfies the (holonomic) jet exact sequence, 0→ Snd → Jdn → Jdn-1 → 0. In particular, for n=1 the sequence is always exact, for n=2 it is exact for 1d flat as a right A-module, and for n 3, it is sufficient to have 1d, 2d, and 3d flat as right A-modules and the vanishing of the Spencer δ-cohomology H,2δd.