**Problem**Is there a minimum integer such that the vertices of any digraph with minimum outdegree can be partitioned into two classes so that the minimum outdegree of the subgraph induced by each class is at least ?

Thomassen [T] proved the conjecture when and showed . In fact, this case is equivalent to the case of the Bermond-Thomassen Conjecture.

The existence of the corresponding function for the undirected analogue is easy and has been observed by many authors. Stiebitz [S] even proved the following tight result: if the minimum degree of an undirected graph is , where each is a non-negative integer, then the vertex set of can be partitioned into pairwise disjoint sets , so that for all , the induced subgraph on has minimum degree at least . This is clearly tight, as shown by an appropriate complete graph.

## Bibliography

*[A] Noga Alon, Disjoint Directed Cycles, Journal of Combinatorial Theory, Series B, 68 (1996), no. 2, 167-178.

[S] M. Stiebitz, Decomposing graphs under degree constraints, J. Graph Theory 23 (1996), 31-324.

[T] C. Thomassen, Disjoint cycles in digraphs, Combinatorica 3 (1983), 393 - 396.

* indicates original appearance(s) of problem.