Beck torsors, formally unramified objects, and K\"ahler differentials

Abstract

Let C be a category with pullbacks. We define a Beck torsor in C as a morphism Z Y in C which is a torsor for a Beck module over Y. We say that an object X of C is formally unramified if, for every Beck torsor Z Y in C, the canonical map HomC(X, Z) HomC(X, Y) is injective. If A is a commutative ring with identity, then an A-algebra B is formally unramified in the category of A-algebras if and only if the ring homomorphism A B is formally unramified. Given that A B is formally unramified if and only if B/A = 0, we seek a similar classification for general formally unramified objects. We say that C has K\"ahler differentials if, for each object X of C, the forgetful functor Ab(C/X) C/X from the category of Beck modules over X has a left adjoint : C/X Ab(C/X). Our main result is that if C has K\"ahler differentials, then an object X of C is formally unramified if and only if X is a zero object in Ab(C/X).