Revising the Fellows-Kaschube $K_{3,3}$ Search

John Boyer

doi:10.7155/jgaa.00569

Revising the Fellows-Kaschube $K_{3,3}$ Search

Authors

John Boyer

DOI:

https://doi.org/10.7155/jgaa.00569

Keywords:

subgraph homeomorphism , homeomorphic subgraph search , algorithm analysis

Abstract

The first algorithm to achieve linear-time performance searching for and identifying a subgraph homeomorphic to $K_{3,3}$ is due to Fellows and Kaschube. Part of the proof of correctness depends on three cases of a straddling bridge of a subgraph homeomorphic to $K_5$ in an input graph. This paper presents a missing fourth case and revises the algorithm with an additional $K_{3,3}$ homeomorph isolator for the condition corresponding to the missing case. This paper also discusses why the prior proof of correctness missed the fourth case and presents a new proof of correctness showing that there are no other missing cases.

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Published

2021-01-01

How to Cite

Boyer, J. (2021). Revising the Fellows-Kaschube $K_{3,3}$ Search. Journal of Graph Algorithms and Applications, 25(1), 513–520. https://doi.org/10.7155/jgaa.00569