Maximal k-Edge-Colorable Subgraphs, Vizing's Theorem, and Tuza's Conjecture
Abstract
We prove that if M is a maximal k-edge-colorable subgraph of a multigraph G and if F = \v ∈ V(G) : dM(v) ≤ k-μ(v)\, then dF(v) ≤ dM(v) for all v ∈ F. (When G is a simple graph, the set F is just the set of vertices having degree less than k in M.) This implies Vizing's Theorem as well as a special case of Tuza's Conjecture on packing and covering of triangles. A more detailed version of our result also implies Vizing's Adjacency Lemma for simple graphs.
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