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IBS Publications RepositoryPioneer Research Center for Mathematical and Computational Sciences(수리 및 계산과학 연구단)Discrete Mathematics Group(이산 수학 그룹)1. Journal Papers (저널논문)
The maximum number of paths of length three in a planar graph
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- Title
- The maximum number of paths of length three in a planar graph
- Author(s)
- Grzesik, Andrzej; Gyori, Ervin; Paulos, Addisu; Salia, Nika; Casey Tompkins; Zamora, Oscar
- Publication Date
- 2022-11
- Journal
- JOURNAL OF GRAPH THEORY, v.101, no.3, pp.493 - 510
- Publisher
- WILEY
- Abstract
- Let f ( n , H ) $f(n,H)$ denote the maximum number of copies of H $H$ possible in an n $n$-vertex planar graph. The function f ( n , H ) $f(n,H)$ has been determined when H $H$ is a cycle of length 3 or 4 by Hakimi and Schmeichel and when H $H$ is a complete bipartite graph with smaller part of size 1 or 2 by Alon and Caro. We determine f ( n , H ) $f(n,H)$ exactly in the case when H $H$ is a path of length 3.
- ISSN
- 0364-9024
- Appears in Collections:
- Pioneer Research Center for Mathematical and Computational Sciences(수리 및 계산과학 연구단) > Discrete Mathematics Group(이산 수학 그룹) > 1. Journal Papers (저널논문)
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