Edge cycle cover


In mathematics, an edge cycle cover of a graph is a family of cycles which are subgraphs of G and contain all edges of G.
If the cycles of the cover have no vertices in common, the cover is called vertex-disjoint or sometimes simply disjoint cycle cover. In this case the set of the cycles constitutes a spanning subgraph of G.
If the cycles of the cover have no edges in common, the cover is called edge-disjoint or simply disjoint cycle cover.

Properties and applications

Minimum-Weight Cycle Cover

For a weighted graph, the Minimum-Weight Cycle Cover Problem is the problem to find a cycle cover with minimal sum of weights of edges in all cycles of the cover.
For bridgeless planar graphs the MWCCP can be solved in polynomial time.

Cycle k-cover

A cycle k-cover of a graph is a family of cycles which cover every edge of G exactly k times. It has been proven that every bridgeless graph has cycle k-cover for any integer even integer k≥4. For k=2, it is the well-known cycle double cover conjecture is an open problem in graph theory. The cycle double cover conjecture states that in every bridgeless graph there exists a set of cycles that together cover every edge of the graph twice.