Erratum to: “Star factorizations of graph products”

## Abstract The original article to which this Erratum refers was published in Journal of Graph Theory 49:11–27. No Abstract.

## Abstract We consider __k__‐factorizations of the complete graph that are 1‐__rotational__ under an assigned group __G__, namely that admit __G__ as an automorphism group acting sharply transitively on all but one vertex. After proving that the __k__‐factors of such a factorization are pairwise i

## Abstract We consider 2‐factorizations of complete graphs that possess an automorphism group fixing __k__⩾0 vertices and acting sharply transitively on the others. We study the structures of such factorizations and consider the cases in which the group is either abelian or dihedral in some more d

It was shown in a recent paper that an rs-regular multigraph G with maximum multiplicity µ(G) ≤ r can be factored into r regular simple graphs if first we allow the deletion of a relatively small number of hamilton cycles from G. In this paper, we use this theorem to obtain extensions of some factor