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Extensions to the notation

According to Habib and Peroche, a k-linear forest consists of paths of k or fewer nodes each.⁹: 219 

According to Burr and Roberts, an (n, j)-linear forest has n vertices and j of its component paths have an odd number of vertices.¹⁰: 245, 246 

According to Faudree et al., a (k, t)-linear or (k, t, s)-linear forest has k edges, and t components of which s are single vertices; s is omitted if its value is not critical.¹¹: 1178, 1179 

Derived concepts

The linear arboricity of a graph is the minimum number of linear forests into which the graph can be partitioned. For a graph of maximum degree Δ {\displaystyle \Delta } , the linear arboricity is always at least ⌈ Δ / 2 ⌉ {\displaystyle \lceil \Delta /2\rceil } , and it is conjectured that it is always at most ⌊ ( Δ + 1 ) / 2 ⌋ {\displaystyle \lfloor (\Delta +1)/2\rfloor } .¹²

A linear coloring of a graph is a proper graph coloring in which the induced subgraph formed by each two colors is a linear forest. The linear chromatic number of a graph is the smallest number of colors used by any linear coloring. The linear chromatic number is at most proportional to Δ 3 / 2 {\displaystyle \Delta ^{3/2}} , and there exist graphs for which it is at least proportional to this quantity.¹³

References

1. Harary, Frank (September 1970). "Covering and Packing in Graphs, I". Annals of the New York Academy of Sciences. 175 (1): 198–205. Bibcode:1970NYASA.175..198H. doi:10.1111/j.1749-6632.1970.tb56470.x. /wiki/Frank_Harary ↩

2. Burr, Stefan A.; Roberts, John A. (May 1974). "On Ramsey numbers for linear forests". Discrete Mathematics. 8 (3). North-Holland Publishing Company: 245–250. doi:10.1016/0012-365x(74)90136-8. MR 0335325. /wiki/Stefan_Burr ↩

3. Brandstädt, Andreas; Giakoumakis, Vassilis; Milanič, Martin (2018-12-11). "Weighted efficient domination for some classes of H-free and of (H1,H2)-free graphs". Discrete Applied Mathematics. 250. Elsevier B.V.: 130–144. doi:10.1016/j.dam.2018.05.012. MR 3868662. EBSCOhost 45704539, 132688071. /wiki/Andreas_Brandst%C3%A4dt ↩

4. Enomoto, Hikoe; Péroche, Bernard (Summer 1984). "The Linear Arboricity of Some Regular Graphs". Journal of Graph Theory. 8 (2): 309–324. doi:10.1002/jgt.3190080211. /wiki/Doi_(identifier) ↩

5. Jain, Sparsh; Pallathumadam, Sreejith K.; Rajendraprasad, Deepak (February 10–12, 2022). "B0-VPG Representation of AT-free Outerplanar Graphs". Written at Puducherry, India. In Balachandran, Niranjan; Inkulu, R. (eds.). Algorithms and Discrete Applied Mathematics: 8th International Conference, CALDAM 2022. Lecture Notes in Computer Science. Vol. 13179. Cham, Switzerland: Springer Nature. pp. 103–114. doi:10.1007/978-3-030-95018-7_9. ISBN 978-3-030-95017-0. 978-3-030-95017-0 ↩

6. de Verdière, Yves Colin (October 1990). "Sur un Nouvel Invariant des Graphes et un Critère de Planarité". Journal of Combinatorial Theory, Series B (in French). 50 (1). Academic Press, Inc.: 11–21. doi:10.1016/0095-8956(90)90093-F. /wiki/Yves_Colin_de_Verdi%C3%A8re ↩

7. van der Holst, Hein; Lovász, László; Schrijver, Alexander (1999) [Preliminary version, March 1997]. "The Colin de Verdière graph parameter". In Lovász, László; Gyárfás, András; Katona, Gyula; Recski, András; Székely, László (eds.). Graph Theory and Combinatorial Biology. Bolyai Society Mathematical Studies. Vol. 7. Budapest, Hungary: János Bolyai Mathematical Society (Hungarian: Bolyai János Matematikai Társulat). pp. 29–85 [1–43]. ISBN 963-8022-90-6. MR 1673503. Archived from the original on 2007-02-06. Associated with the "International Colloquium on Combinatorics and Graph Theory" in Balatonlelle on July 1996 (see p. 5 and http://wwwold.sztaki.hu/library/publtop/gyarf.jhtml). {{cite book}}: External link in |postscript= (help)CS1 maint: postscript (link) 963-8022-90-6 ↩

8. Clark, Curtis (1984). An Approach to Graph Achievement Games: Ultimately Economical Graphs (PhD thesis). Ann Arbor, Michigan: University of Michigan. ISBN 979-8-204-34535-5. ProQuest 303324911 (UMI 8502782) – via ProQuest Dissertations & Theses Global. 979-8-204-34535-5 ↩

9. Habib, M.; Peroche, B. (1982). "Some problems about linear arboricity". Discrete Mathematics. 41 (2). North-Holland Publishing Company: 219–220. doi:10.1016/0012-365x(82)90209-6. https://doi.org/10.1016%2F0012-365x%2882%2990209-6 ↩

10. Burr, Stefan A.; Roberts, John A. (May 1974). "On Ramsey numbers for linear forests". Discrete Mathematics. 8 (3). North-Holland Publishing Company: 245–250. doi:10.1016/0012-365x(74)90136-8. MR 0335325. /wiki/Stefan_Burr ↩

11. Faudree, Ralph J.; Gould, Ronald J.; Jacobson, Michael S. (28 March 2009). "Pancyclic graphs and linear forests". Discrete Mathematics. 309 (5). Elsevier B.V.: 1178–1189. doi:10.1016/j.disc.2007.12.094. /wiki/Ralph_Faudree ↩

12. Alon, N. (1988), "The linear arboricity of graphs", Israel Journal of Mathematics, 62 (3): 311–325, CiteSeerX 10.1.1.163.1965, doi:10.1007/BF02783300, MR 0955135. /wiki/Noga_Alon ↩

13. Yuster, Raphael (1998), "Linear coloring of graphs", Discrete Mathematics, 185 (1–3): 293–297, doi:10.1016/S0012-365X(97)00209-4, MR 1614290. /wiki/Discrete_Mathematics_(journal) ↩