Total Rainbow Connection Number and Complementary Graph

Let l ≥ 1, k ≥ 1 be two integers. Given an edge-coloured connected graph G. A path P in the graph G is called l-rainbow path if each subpath of length at most l + 1 is rainbow. The graph G is called (k, l)-rainbow connected if any two vertices in G are connected by at least k pairwise internally vertex-disjoint l-rainbow paths. The smallest number of colours needed in order to make G (k, l)-rainbow connected is called the (k, l)-rainbow connection number of G and denoted by rck,l(G). In this paper, we first focus to improve the upper bound of the (1, l)-rainbow connection number depending on the size of connected graphs. Using this result, we characterize all connected graphs having the large (1, 2)-rainbow connection number. Moreover, we also determine the (1, l)-rainbow connection number in a connected graph G containing a sequence of cut-edges.

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PENENTUAN RAINBOW CONNECTION NUMBER UNTUK AMALGAMASI GRAF LENGKAP DENGAN GRAF RODA

Jurnal Matematika UNAND ◽

10.25077/jmu.8.1.345-347.2019 ◽

2019 ◽

Vol 8 (1) ◽

pp. 345

Author(s):

Risya Hazani Utari ◽

Lyra Yulianti ◽

Syafrizal Sy

Keyword(s):

Connection Number ◽

Rainbow Connection Number ◽

Rainbow Connection

Suatu pewarnaan terhadap sisi-sisi di graf G terhubung tak trivial didefinisikan sebagai c : E(G) → {1, 2, · · · , k} untuk k ∈ N adalah suatu pewarnaan terhadap sisi-sisi di G sedemikian sehingga setiap sisi yang bertetangga boleh diberi warna yang sama. Banyaknya warna minimal yang diperlukan untuk membuat graf G bersifat rainbow connected disebut dengan rainbow connection number dari G, yang dinotasikan dengan rc(G). Penelitian ini menentukan rainbow connection number untuk amalgamasi 2 buah graf lengkap K4 dengan 2 buah graf roda W4 yang diperoleh dari menggabungkan satu titik pada setiap graf lengkap K4 dengan satu titik pusat pada setiap graf roda W4.Kata Kunci: Amalgamasi, Graf lengkap K4, Graf Roda W4, Rainbow Connection Number

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Rainbow connection number and graph operations

Discrete Applied Mathematics ◽

10.1016/j.dam.2017.06.004 ◽

2017 ◽

Vol 230 ◽

pp. 91-99 ◽

Cited By ~ 1

Author(s):

Hengzhe Li ◽

Yingbin Ma

Keyword(s):

Connection Number ◽

Graph Operations ◽

Rainbow Connection Number ◽

Rainbow Connection

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The Rainbow Connection Number of a Flower (Cm, Kn) Graph and a Flower (C3, Fn) Graph

Procedia Computer Science ◽

10.1016/j.procs.2015.12.094 ◽

2015 ◽

Vol 74 ◽

pp. 168-172 ◽

Cited By ~ 5

Author(s):

Irvania Sukma Kumala ◽

A.N.M. Salman

Keyword(s):

Connection Number ◽

Rainbow Connection Number ◽

Rainbow Connection

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Total rainbow connection number of n-Centipede graph and its line, square, and middle graph

10.1063/5.0016815 ◽

2020 ◽

Author(s):

Dorotea Rahmawati ◽

Fransiskus Fran ◽

Yudhi ◽

Dedy Krisantoni

Keyword(s):

Connection Number ◽

Rainbow Connection Number ◽

Rainbow Connection ◽

Middle Graph

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Rainbow Connection Number and Chromatic Index of Rough Ideal based Rough Edge Cayley Graph

International Journal of Engineering & Technology ◽

10.14419/ijet.v7i3.13094 ◽

2018 ◽

Vol 7 (3) ◽

pp. 1926 ◽

Cited By ~ 1

Author(s):

B. Praba ◽

X.A. Benazir Obilia

Keyword(s):

Graph Theory ◽

Cayley Graph ◽

Chromatic Index ◽

Connection Number ◽

Rainbow Connection Number ◽

Rainbow Connection

Rainbow connection number and chromatic index are two significant parameters in the study ofgraph theory. In this work, rainbow connection number and chromatic index of Rough Ideal based Rough Edge Cayley Graph G(T(J)) are evaluated. We prove that the rainbow connection number of G(T(J)) is 2 and the chromatic index of G(T(J)) is 2(2n^m)(3m^1):Rainbow connection number and chromatic index are two significant parameters in the study of graph theory. In this work, rainbow connection number and chromatic index of Rough Ideal based Rough Edge Cayley Graph are evaluated. We prove that the rainbow connection number of is 2 and the chromatic index of is .

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The Rainbow Connection Number of Origami Graphs and Pizza Graphs

Procedia Computer Science ◽

10.1016/j.procs.2015.12.093 ◽

2015 ◽

Vol 74 ◽

pp. 162-167 ◽

Cited By ~ 4

Author(s):

S. Nabila ◽

A.N.M. Salman

Keyword(s):

Connection Number ◽

Rainbow Connection Number ◽

Rainbow Connection

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The Rainbow Connection Number of Triangular Snake Graphs

10.5753/etc.2020.11091 ◽

2020 ◽

Author(s):

Aleffer Rocha ◽

Sheila M. Almeida ◽

Leandro M. Zatesko

Keyword(s):

Information Security ◽

Edge Coloring ◽

Connection Number ◽

Rainbow Connection Number ◽

Proper Edge Coloring ◽

Rainbow Connection ◽

Rainbow Coloring

Rainbow coloring problems, of noteworthy applications in Information Security, have been receiving much attention last years in Combinatorics. The rainbow connection number of a graph G is the least number of colors for a (not necessarily proper) edge coloring of G such that between any pair of vertices there is a path whose edge colors are all distinct. In this paper we determine the rainbow connection number of the triple triangular snake graphs.

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Graphs with rainbow connection number two

Discussiones Mathematicae Graph Theory ◽

10.7151/dmgt.1547 ◽

2011 ◽

Vol 31 (2) ◽

pp. 313 ◽

Cited By ~ 20

Author(s):

Arnfried Kemnitz ◽

Ingo Schiermeyer

Keyword(s):

Connection Number ◽

Rainbow Connection Number ◽

Rainbow Connection

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RAINBOW CONNECTION PADA BEBERAPA GRAF

Jurnal Matematika UNAND ◽

10.25077/jmu.2.2.17-25.2013 ◽

2013 ◽

Vol 2 (2) ◽

pp. 17

Author(s):

Gema Hista Medika

Keyword(s):

Connection Number ◽

Rainbow Connection Number ◽

Rainbow Connection ◽

Rainbow Path ◽

Rainbow Coloring

Misalkan G adalah graf terhubung tak-trivial. Denisikan pewarnaan c :E(G) ! f1; 2; :::; kg, k 2 N, dimana dua sisi yang bertetangga boleh memiliki warnayang sama. Suatu u 􀀀 v path P di G dikatakan rainbow path jika tidak ada dua sisi diP yang memiliki warna sama. Graf G dikatakan rainbow connected jika setiap dua titikyang berbeda di G dihubungkan oleh rainbow path. Pewarnaan sisi yang menyebabkan Gbersifat rainbow connected dikatakan rainbow coloring. Rainbow connection number darigraf terhubung G, ditulis rc(G), didenisikan sebagai banyaknya warna minimal yangdiperlukan untuk membuat graf G bersifat rainbow connected. Misalkan c adalah rainbowcoloring dari graf terhubung G. Untuk dua titik u dan v di G, rainbow u-v geodesic padaG adalah rainbow u-v path yang panjangnya d(u; v), dimana d(u; v) adalah jarak antarau dan v (panjang u-v path terpendek di G). Graf G dikatakan strongly rainbow-connectedjika G memiliki suatu rainbow u-v geodesic untuk setiap dua titik u dan v di G. Mini-mum k yang terdapat pada pewarnaan c : E(G) ! f1; 2; :::; kg sedemikian sehingga Gadalah strongly rainbow-connected dikatakan strong rainbow connection number, src(G);di G. Jadi, rc(G) src(G) untuk setiap graf terhubung di G. Pada paper ini akan di-ulas kembali tentang strong rainbow connection number dari graf bipartit lengkap Ks;tdengan 1 s t dimana s; t 2 N adalah src(Ks;t) = d spte, sedangkan rainbow connec-tion number dari graf bipartit lengkap Ks;t dengan 2 s t dimana s; t 2 N adalahrc(Ks;t) = minfd spte; 4g.

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