English

Finding Short Cycles in an Embedded Graph in Polynomial Time

Combinatorics 2008-07-11 v1

Abstract

Let C1{\cal{C}}_1 be the set of fundamental cycles of breadth-first-search trees in a graph GG and C2{\cal{C}}_2 the set of the sums of two cycles in C1{\cal{C}}_1. Then we show that (1)C=C1C2(1) {\cal{C}}={\cal{C}}_1\bigcup{\cal{C}}_2 contains a shortest Π\Pi-twosided cycle in a Π\Pi-embedded graph GG;(2)(2) C\cal{C} contains all the possible shortest even cycles in a graph GG;(3)(3) If a shortest cycle in a graph GG is an odd cycle, then C\cal{C} contains all the shortest odd cycles in GG. This implies the existence of a polynomially bounded algorithm to find a shortest Π\Pi-twosided cycle in an embedded graph and thus solves an open problem of B.Mohar and C.Thomassen[2,pp112]

Keywords

Cite

@article{arxiv.0807.1620,
  title  = {Finding Short Cycles in an Embedded Graph in Polynomial Time},
  author = {Han Ren and Ni Cao},
  journal= {arXiv preprint arXiv:0807.1620},
  year   = {2008}
}
R2 v1 2026-06-21T10:59:13.489Z