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On the number of vertices of positively curved planar graphs

Authors
Oh, Byung-Geun
Issue Date
Jun-2017
Publisher
Elsevier BV
Keywords
Planar graph; Combinatorial curvature; Discharging method
Citation
Discrete Mathematics, v.340, no.6, pp 1300 - 1310
Pages
11
Indexed
SCI
SCIE
SCOPUS
Journal Title
Discrete Mathematics
Volume
340
Number
6
Start Page
1300
End Page
1310
URI
https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/152227
DOI
10.1016/j.disc.2017.01.025
ISSN
0012-365X
1872-681X
Abstract
For a connected simple graph embedded into a 2-sphere, we show that the number of vertices of the graph is less than or equal to 380 if the degree of each vertex is at least three, the combinatorial vertex curvature is positive everywhere, and the graph is different from prisms and antiprisms. This gives a new upper bound for the constant brought up by DeVos and Mohar in their paper from 2007. We also show that if a graph is embedded into a projective plane instead of a 2-sphere but satisfies the other properties listed above, then the number of vertices is at most 190.
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