Qiaoping Guo

Orcid: 0000-0002-1965-953X

According to our database1, Qiaoping Guo authored at least 23 papers between 2010 and 2026.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of four.

Timeline

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Book  In proceedings  Article  PhD thesis  Dataset  Other 

Links

On csauthors.net:

Bibliography

2026
Chorded edge pancyclicity and chorded vertex pancyclicity with the distance two degree condition.
Discret. Math., 2026

Hamiltonicity and bipancyclicity of balanced bipartite digraphs.
Discret. Appl. Math., 2026

2025
Degree condition on distance three for Hamiltonian-biconnected in balanced bipartite graphs.
Discret. Math., 2025

2023
A Sufficient Condition for Vertex Bipancyclicity in Balanced Bipartite Graphs.
Graphs Comb., August, 2023

2021
Outpaths of arcs in regular 3-partite tournaments.
Discuss. Math. Graph Theory, 2021

On the <i>n</i>-partite tournaments with exactly <i>n-m+1</i> cycles of length <i>m</i>.
Discuss. Math. Graph Theory, 2021

2019
On cycles in regular 3-partite tournaments.
Discret. Math., 2019

2017
The structure of strong tournaments containing exactly one out-arc pancyclic vertex.
Australas. J Comb., 2017

2016
Cycles through an arc in regular 3-partite tournaments.
Discret. Math., 2016

2015
Generalizing Vertex Pancyclic and k-ordered Graphs.
Graphs Comb., 2015

2014
The Number of Out-Pancyclic Vertices in a Strong Tournament.
Graphs Comb., 2014

The H-force set of a hypertournament.
Discret. Appl. Math., 2014

Signed cycle domination numbers of digraphs.
Ars Comb., 2014

2013
Notes on vertex pancyclicity of graphs.
Inf. Process. Lett., 2013

Cycles through a given arc and certain partite sets in strong multipartite tournaments.
Australas. J Comb., 2013

The out-arc 5-pancyclic vertices in strong tournaments.
Australas. J Comb., 2013

2012
The structure of 4-strong tournaments containing exactly three out-arc pancyclic vertices.
J. Graph Theory, 2012

Pancyclic out-arcs of a vertex in oriented graphs.
Inf. Process. Lett., 2012

The solution and applications of a combinatorial problem.
Discret. Appl. Math., 2012

Notes on cycles through a vertex or an arc in regular 3-partite tournaments.
Appl. Math. Lett., 2012

2011
Strong subtournaments of order c containing a given vertex in regular c-partite tournaments with c≥16.
Discret. Math., 2011

Cycles through arcs in multipartite tournaments and a conjecture of Volkmann.
Appl. Math. Lett., 2011

2010
Out-arc pancyclicity of vertices in tournaments.
Discret. Appl. Math., 2010


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