A. R. Garzon, A. del Rio
abstract:
Given a categorical crossed module H --> G, where G is a group, we show that
the category of derivations, Der(G, H), from G into H has a natural monoidal
structure. We introduce the Whitehead categorical group of derivations as the
Picard category of Der(G, H) and then we characterize the invertible
derivations, with respect to the tensor product, in this monoidal category.