Discussiones Mathematicae Graph Theory (Nov 2016)

An Extension of Kotzig’s Theorem

  • Aksenov Valerii A.,
  • Borodin Oleg V.,
  • Ivanova Anna O.

DOI
https://doi.org/10.7151/dmgt.1904
Journal volume & issue
Vol. 36, no. 4
pp. 889 – 897

Abstract

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In 1955, Kotzig proved that every 3-connected planar graph has an edge with the degree sum of its end vertices at most 13, which is tight. An edge uv is of type (i, j) if d(u) ≤ i and d(v) ≤ j. Borodin (1991) proved that every normal plane map contains an edge of one of the types (3, 10), (4, 7), or (5, 6), which is tight. Cole, Kowalik, and Škrekovski (2007) deduced from this result by Borodin that Kotzig’s bound of 13 is valid for all planar graphs with minimum degree δ at least 2 in which every d-vertex, d ≥ 12, has at most d − 11 neighbors of degree 2.

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