Hasse--Schmidt derivations, divided powers and differential smoothness

Abstract

Let k be a commutative ring, A a commutative k-algebra and D the filtered ring of k-linear differential operators of A. We prove that: (1) The graded ring D admits a canonical embedding θ into the graded dual of the symmetric algebra of the module A/k of differentials of A over k, which has a canonical divided power structure. (2) There is a canonical morphism from the divided power algebra of the module of k-linear Hasse-Schmidt integrable derivations of A to D. (3) Morphisms θ and fit into a canonical commutative diagram.