H. J. Baues, M. Jibladze
abstract:
In the general setting of groupoid enriched categories, notions
of \emph{suspender} and \emph{looper} of a map are introduced,
formalizing a generalization of the classical homotopy-theoretic
notions of suspension and loop space. The formalism enables subtle
analysis of these constructs. In particular, it is shown that the
suspender of a principal coaction splits as a coproduct. This
result leads to the notion of \emph{theories with suspension} and
to the cohomological classification of certain groupoid enriched
categories.