One can possibly enlarge the simplex category to a one of the several interesting categories in homological algebra like cycle category of Connes and the skeletal category of finite sets. Such examples can be founded axiomatically as kind of extensions of the simplex category by a group with special properties. The resulting notion is a skew-simplicial group (synonym: crossed simplicial group): the presheaves on a skew-simplicial group are skew-simplicial sets of the corresponding kind. In addition to cyclic and symmetric simplicial sets other important applications are dihedral, quaternionic and hyperoctahedral sets/homology (cf. Loday MR89e:18024). The formalism has been found by Krasauskas and a bit later and independently also by Fiedorowicz and Loday.
The important special cases are symmetric set, cyclic set, simplicial set, dihedral set.
Original references are
A connection to geometry of surfaces is sketched in
A recent treatise on connection to geometry is
They also play a major role in
Recent work
Last revised on October 30, 2024 at 02:27:33. See the history of this page for a list of all contributions to it.