A constructive solution to the Oberwolfach Problem with a large cycle

Abstract

For every 2-regular graph F of order v, the Oberwolfach problem OP(F) asks whether there is a 2-factorization of Kv (v odd) or Kv minus a 1-factor (v even) into copies of F. Posed by Ringel in 1967 and extensively studied ever since, this problem is still open. In this paper we construct solutions to OP(F) whenever F contains a cycle of length greater than an explicit lower bound. Our constructions combine the amalgamation-detachment technique with methods aimed at building 2-factorizations with an automorphism group having a nearly-regular action on the vertex-set.