Degree sums for edges and cycle lengths in graphs

Stephan Brandt; Henk Jan Veldman

doi:10.1002/(SICI)1097-0118(199708)25:4<253::AID-JGT2>3.0.CO;2-J

Degree sums for edges and cycle lengths in graphs

Stephan Brandt, Henk Jan Veldman

Discrete Mathematics and Mathematical Programming

Research output: Contribution to journal › Article › Academic › peer-review

8 Citations (Scopus)

326 Downloads (Pure)

Abstract

Let G be a graph of order n satisfying d(u) + d(v) n for every edge uv of G. We show that the circumference - the length of a longest cycle - of G can be expressed in terms of a certain graph parameter, and can be computed in polynomial time. Moreover, we show that G contains cycles of every length between 3 and the circumference, unless G is complete bipartite. If G is 1-tough then it is pancyclic or G = Kr,r with r = n/2.

Original language	English
Pages (from-to)	253-256
Number of pages	4
Journal	Journal of graph theory
Volume	25
Issue number	4
DOIs	https://doi.org/10.1002/(SICI)1097-0118(199708)25:4<253::AID-JGT2>3.0.CO;2-J
Publication status	Published - 1997

Keywords

Circumference
Closure
Cycle
Graph
Degree
Pancyclic
Sum
Tough
Hamiltonian

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10.1002/(SICI)1097-0118(199708)25:4<253::AID-JGT2>3.0.CO;2-J

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title = "Degree sums for edges and cycle lengths in graphs",

abstract = "Let G be a graph of order n satisfying d(u) + d(v) n for every edge uv of G. We show that the circumference - the length of a longest cycle - of G can be expressed in terms of a certain graph parameter, and can be computed in polynomial time. Moreover, we show that G contains cycles of every length between 3 and the circumference, unless G is complete bipartite. If G is 1-tough then it is pancyclic or G = Kr,r with r = n/2.",

keywords = "Circumference, Closure, Cycle, Graph, Degree, Pancyclic, Sum, Tough, Hamiltonian",

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T1 - Degree sums for edges and cycle lengths in graphs

AU - Brandt, Stephan

AU - Veldman, Henk Jan

PY - 1997

Y1 - 1997

N2 - Let G be a graph of order n satisfying d(u) + d(v) n for every edge uv of G. We show that the circumference - the length of a longest cycle - of G can be expressed in terms of a certain graph parameter, and can be computed in polynomial time. Moreover, we show that G contains cycles of every length between 3 and the circumference, unless G is complete bipartite. If G is 1-tough then it is pancyclic or G = Kr,r with r = n/2.

AB - Let G be a graph of order n satisfying d(u) + d(v) n for every edge uv of G. We show that the circumference - the length of a longest cycle - of G can be expressed in terms of a certain graph parameter, and can be computed in polynomial time. Moreover, we show that G contains cycles of every length between 3 and the circumference, unless G is complete bipartite. If G is 1-tough then it is pancyclic or G = Kr,r with r = n/2.

KW - Circumference

KW - Closure

KW - Cycle

KW - Graph

KW - Degree

KW - Pancyclic

KW - Sum

KW - Tough

KW - Hamiltonian

U2 - 10.1002/(SICI)1097-0118(199708)25:4<253::AID-JGT2>3.0.CO;2-J

DO - 10.1002/(SICI)1097-0118(199708)25:4<253::AID-JGT2>3.0.CO;2-J

M3 - Article

VL - 25

SP - 253

EP - 256

JO - Journal of graph theory

JF - Journal of graph theory

SN - 0364-9024

IS - 4

ER -

Degree sums for edges and cycle lengths in graphs

Abstract

Keywords

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