On covering cubic graphs with three perfect matchings
Abstract
For a bridgeless cubic graph G, m3(G) is the ratio of the maximum number of edges of G covered by the union of 3 perfect matchings to |E(G)|. We prove that for any r∈ [4/5, 1), there exist infinitely many cubic graphs G such that m3(G) = r. For any r∈ [9/10, 1), there exist infinitely many cyclically 4-connected cubic graphs G with m3(G) = r.
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