A charcterization of 4-edge-connected eulerian graphs

Let v be an arbitrary vertex of a 4-edge-connected Eulerian graph G. First we show the existence of a nonseparating cycle decompositiion of G with respect to v. With the help of this decomposition we are then able to construct 4 edge-independent spanning trees with the common root v in the sam graph. We conclude that an Eulerian graph G is 4-edge-connected iff for every vertex r ? V (G) there exist 4 edge-independent spanning trees with a common root r. © 1996 John Wiley & Sons, Inc.