The directed Oberwolfach problem with variable cycle lengths: a recursive construction

Abstract

The directed Oberwolfach problem OP(m1,…,mk) asks whether the complete symmetric digraph Kn, assuming n=m1+… +mk, admits a decomposition into spanning subdigraphs, each a disjoint union of k directed cycles of lengths m1,…,mk. We hereby describe a method for constructing a solution to OP(m1,…,mk) given a solution to OP(m1,…,m), for some <k, if certain conditions on m1,…,mk are satisfied. This approach enables us to extend a solution for OP(m1,…,m) into a solution for OP(m1,…,m,t), as well as into a solution for OP(m1,…,m,2 t ), where 2 t denotes t copies of 2, provided t is sufficiently large. In particular, our recursive construction allows us to effectively address the two-table directed Oberwolfach problem. We show that OP(m1,m2) has a solution for all 2 m1 m2, with a definite exception of m1=m2=3 and a possible exception in the case that m1 ∈ \ 4,6 \, m2 is even, and m1+m2 14. It has been shown previously that OP(m1,m2) has a solution if m1+m2 is odd, and that OP(m,m) has a solution if and only if m 3. In addition to solving many other cases of OP, we show that when 2 m1+… +mk 13, OP(m1,…,mk) has a solution if and only if (m1,…,mk) ∈ \ (4),(6),(3,3) \.