%A Glock, Stefan
%A Joos, Felix
%A Kim, Jaehoon
%A Kühn, Daniela
%A Osthus, Deryk
%D 2019
%T Resolution of the Oberwolfach problem
%K
%X The Oberwolfach problem, posed by Ringel in 1967, asks for a decomposition of $K_{2n+1}$ into edge-disjoint copies of a given $2$-factor. We show that this can be achieved for all large $n$. We actually prove a significantly more general result, which allows for decompositions into more general types of factors. In particular, this also resolves the Hamilton-Waterloo problem for large $n$.
%U http://www.iam.fmph.uniba.sk/amuc/ojs/index.php/amuc/article/view/1250
%J Acta Mathematica Universitatis Comenianae
%0 Journal Article
%P 735-741%V 88
%N 3
%@ 0862-9544
%8 2019-07-30