Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Sárközy, Gábor N.
and
Selkow, Stanley M.
2000.
Vertex Partitions by Connected Monochromatic k-Regular Graphs.
Journal of Combinatorial Theory, Series B,
Vol. 78,
Issue. 1,
p.
115.
Komlós, János
Shokoufandeh, Ali
Simonovits, Miklós
and
Szemerédi, Endre
2002.
Theoretical Aspects of Computer Science.
Vol. 2292,
Issue. ,
p.
84.
Kaneko, Atsushi
Kano, M.
and
Suzuki, Kazuhiro
2005.
Partitioning complete multipartite graphs by monochromatic trees.
Journal of Graph Theory,
Vol. 48,
Issue. 2,
p.
133.
Gyárfás, András
Ruszinkó, Miklós
Sárközy, Gábor N.
and
Szemerédi, Endre
2006.
An improved bound for the monochromatic cycle partition number.
Journal of Combinatorial Theory, Series B,
Vol. 96,
Issue. 6,
p.
855.
ALLEN, PETER
2008.
Covering Two-Edge-Coloured Complete Graphs with Two Disjoint Monochromatic Cycles.
Combinatorics, Probability and Computing,
Vol. 17,
Issue. 4,
p.
471.
Chen, He
Jin, Zemin
Li, Xueliang
and
Tu, Jianhua
2008.
Heterochromatic tree partition numbers for complete bipartite graphs.
Discrete Mathematics,
Vol. 308,
Issue. 17,
p.
3871.
Bessy, Stéphane
and
Thomassé, Stéphan
2010.
Partitioning a graph into a cycle and an anticycle, a proof of Lehel's conjecture.
Journal of Combinatorial Theory, Series B,
Vol. 100,
Issue. 2,
p.
176.
Sárközy, Gábor N.
2011.
Monochromatic cycle partitions of edge-colored graphs.
Journal of Graph Theory,
Vol. 66,
Issue. 1,
p.
57.
Pokrovskiy, Alexey
2011.
Partitioning 3-coloured complete graphs into three monochromatic paths.
Electronic Notes in Discrete Mathematics,
Vol. 38,
Issue. ,
p.
717.
Sárközy, Gábor N.
Selkow, Stanley M.
and
Song, Fei
2011.
Vertex partitions of non-complete graphs into connected monochromatic k-regular graphs.
Discrete Mathematics,
Vol. 311,
Issue. 18-19,
p.
2079.
Jin, Ze-min
and
Li, Xue-liang
2012.
Partitioning complete graphs by heterochromatic trees.
Acta Mathematicae Applicatae Sinica, English Series,
Vol. 28,
Issue. 4,
p.
625.
Jin, Zemin
Wen, Shili
and
Zhou, Shujun
2012.
Heterochromatic tree partition problem in complete tripartite graphs.
Discrete Mathematics,
Vol. 312,
Issue. 4,
p.
789.
Sárközy, Gábor N.
Selkow, Stanley M.
and
Song, Fei
2013.
An Improved Bound for Vertex Partitions by Connected Monochromatic K-Regular Graphs.
Journal of Graph Theory,
Vol. 73,
Issue. 2,
p.
127.
Pokrovskiy, Alexey
2013.
Partitioning edge-coloured complete graphs into monochromatic cycles.
Electronic Notes in Discrete Mathematics,
Vol. 43,
Issue. ,
p.
311.
Jin, Zemin
and
Zhu, Peipei
2014.
Heterochromatic tree partition number in complete multipartite graphs.
Journal of Combinatorial Optimization,
Vol. 28,
Issue. 2,
p.
321.
Pokrovskiy, Alexey
2014.
Partitioning edge-coloured complete graphs into monochromatic cycles and paths.
Journal of Combinatorial Theory, Series B,
Vol. 106,
Issue. ,
p.
70.
Sárközy, Gábor N.
2014.
Improved monochromatic loose cycle partitions in hypergraphs.
Discrete Mathematics,
Vol. 334,
Issue. ,
p.
52.
Balogh, József
Barát, János
Gerbner, Dániel
Gyárfás, András
and
Sárközy, Gábor N.
2014.
Partitioning 2-edge-colored graphs by monochromatic paths and cycles.
Combinatorica,
Vol. 34,
Issue. 5,
p.
507.
Gyárfás, András
Sárközy, Gábor N.
and
Selkow, Stanley
2015.
Coverings by Few Monochromatic Pieces: A Transition Between Two Ramsey Problems.
Graphs and Combinatorics,
Vol. 31,
Issue. 1,
p.
131.
Schaudt, Oliver
and
Stein, Maya
2015.
Partitioning two-coloured complete multipartite graphs into monochromatic paths and cycles.
Electronic Notes in Discrete Mathematics,
Vol. 50,
Issue. ,
p.
313.