The matching extendability of optimal 1-embedded graphs on the projective plane

Abstract

In this paper, we discuss matching extendability of optimal 1-projective plane graphs (abbreviated as O1PPG), which are drawn on the projective plane P2 so that every edge crosses another edge at most once, and has n vertices and exactly 4n- 4 edges. We first show that every O1PPG of even order is 1-extendable. Next, we characterize 2-extendable O1PPG's in terms of a separating cycle consisting of only non-crossing edges. Moreover, we characterize O1PPG's having connectivity exactly 5. Using the characterization, we further identify three independent edges in those graphs that are not extendable.

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