Problem 1: In edge coloring, we assign colors to the edges of G so that all the edges incident to a vertex receive different colors. 0(G) is the minimum number of colors required to edge color G.
Assume 0(G) > (G)+1 but for any edge xy, 0(Gxy) = +1. Prove that in every proper edge coloring of Gxy there exists a path from x to y in which the edges alternate between two colors. (We can use this fact to prove Vizings Theorem: 0(G) (G) + 1 by induction.)
Problem 2: Assume G is a -regular multigraph, and assume is even. Prove that
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