Linkage problem on optimal 1-planar graphs
Abstract
Enami and Maezawa give a complete characterization of (s1, s2, …, sk)-linked planar graphs for any k-tuple of positive integers. In this paper, we investigate linkage problems for optimal 1-planar graphs. In particular, we show that every optimal 1-planar graph with connectivity 6 is (5, 5)-linked. Moreover, for an optimal 1-planar graph G that is not (2,2,1)-linked, we characterize disjoint vertex subsets S1, S2, S3 in G with |S1|=|S2|=2 and |S3|=1 such that G is not \S1,S2,S3\-linked.
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