Faithfulness of simple 2-representations of sl2

Abstract

Let U be the 2-category associated with sl2. We prove that a complex of 1-morphisms of U is null-homotopic if and only if its image in every simple 2-representation is null-homotopic. Under mild boundedness assumptions, we prove that it actually suffices for the image in the simple 2-representations to be acyclic. We apply this result to the study of the Rickard complex categorifying the action of the simple reflection of SL2. We prove that is invertible in the homotopy category of , and that there is a homotopy equivalence E F[-1].