The Turán number of the graph \(3P_4\)

Halina Bielak, Sebastian Kieliszek

Abstract


Let \(ex(n, G)\) denote the maximum number of edges in a graph on \(n\) vertices which does not contain \(G\) as a subgraph. Let \(P_i\) denote a path consisting of \(i\) vertices and let \(mP_i\) denote \(m\) disjoint copies of \(P_i\). In this paper we count \(ex(n, 3P_4)\).

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References


Bushaw, N., Kettle, N., Turán numbers of multiple paths and equibipartite forests, Combin. Probab. Comput. 20 (2011), 837-853.

Erdős, P., Gallai, T., On maximal paths and circuits of graphs, Acta Math. Acad. Sci. Hungar. 10 (1959), 337-356.

Faudree, R. J., Schelp, R. H., Path Ramsey numbers in multicolorings, J. Combin. Theory Ser. B 19 (1975), 150-160.

Gorgol, I., Turán numbers for disjoint copies of graphs, Graphs Combin. 27 (2011), 661-667.

Harary, F., Graph Theory, Addison-Wesley, Mass.-Menlo Park, Calif.-London, 1969.




DOI: http://dx.doi.org/10.2478/umcsmath-2014-0003
Date of publication: 2015-05-23 16:29:35
Date of submission: 2015-05-04 21:21:53


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