Abstract.
We prove that each 3-connected plane graph G without triangular or quadrangular faces either contains a k-path P k , a path on k vertices, such that each of its k vertices has degree ≤5/3k in G or does not contain any k-path. We also prove that each 3-connected pentagonal plane graph G which has a k-cycle, a cycle on k vertices, k∈ {5,8,11,14}, contains a k-cycle such that all its vertices have, in G, bounded degrees. Moreover, for all integers k and m, k≥ 3, k∉ {5,8,11,14} and m≥ 3, we present a graph in which every k-cycle contains a vertex of degree at least m.
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Received: June 29, 1998 Final version received: April 11, 2000
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Jendrol', S., Owens, P. On Light Graphs in 3-Connected Plane Graphs Without Triangular or Quadrangular Faces. Graphs Comb 17, 659–680 (2001). https://doi.org/10.1007/s003730170007
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DOI: https://doi.org/10.1007/s003730170007