Connected Square Network Graphs

Burhan Selçuk

doi:10.32323/ujma.1058116

Research Article

Connected Square Network Graphs

Year 2022, Volume: 5 Issue: 2, 57 - 63, 30.06.2022

Burhan Selçuk

https://doi.org/10.32323/ujma.1058116

Cited By: 1

Abstract

In this study, connected square network graphs are introduced and two different definitions are given. Firstly, connected square network graphs are shown to be a Hamilton graph. Further, the labelling algorithm of this graph is obtained by using gray code. Finally, its topological properties are obtained, and conclusion are given.

Keywords

Hamilton Graph, Interconnection Network, Graphical indices

References

[1] A. El-Amawy, S. Latifi, Properties and performance of folded hypercubes, IEEE Trans. Parallel Distrib. Syst., 2(1) (1991), 31-42.
[2] H. Y. Chang, R. J. Chen, Incrementally extensible folded hypercube graphs, J. Inf. Sci. Eng., 16(2), (2000), 291-300.
[3] Q. Dong, X. Yang, J. Zhao, Y. Y. Tang, Embedding a family of disjoint 3D meshes into a crossed cube, Inf. Sci. 178 (2008), 2396-2405.
[4] K. Efe, The crossed cube architecture for parallel computation, IEEE Trans. Parallel Distrib. Syst., 40 (1991), 1312-1316.
[5] C. J. Lai, C. H. Tsai, H. C. Hsu, T. K. Li, A dynamic programming algorithm for simulation of a multi-dimensional torus in a crossed cube, Inf. Sci., 180 (2010), 5090-5100.
[6] M. Abd-El-Barr, T. F. Soman, Topological properties of hierarchical interconnection networks a review and comparison, J. Electr. Comput. Eng., (2011).
[7] K. Chose, K. R. Desai, Hierarchical cubic networks, IEEE Trans. Parallel Distrib. Syst., 6 (1995), 427-435.
[8] A. Karci, Hierarchical extended Fibonacci cubes, Iran. J. Sci. Technol. Trans. B Eng., 29 (2005), 117-125.
[9] A. Karci, Hierarchic graphs based on the Fibonacci numbers, Istanbul Univ. J. Electr. Electron. Eng., 7(1) (2007), 345-365.
[10] A. Karcı, B. Selc¸uk, A new hypercube variant: Fractal Cubic Network Graph, Eng. Sci. Technol. an Int. J., 18(1) (2014), 32-41.
[11] B. Selc¸uk, A. Karcı, Connected cubic network graph, Eng. Sci. Technol. an Int. J., 20(3) (2017), 934-943.
[12] E. D. Knuth, Generating all n-tuples, The Art of Computer Programming, Volume 4A: Enumeration and Backtracking, Pre-Fascicle 2a, 2004.
[13] G. Caporossi, I. Gutman, P. Hansen, L. Pavlovi´c, Graphs with maximum connectivity index, Comput. Biol. Chem., 27(1) (2003), 85-90.

Year 2022, Volume: 5 Issue: 2, 57 - 63, 30.06.2022

Burhan Selçuk

https://doi.org/10.32323/ujma.1058116

Cited By: 1

Abstract

References

[1] A. El-Amawy, S. Latifi, Properties and performance of folded hypercubes, IEEE Trans. Parallel Distrib. Syst., 2(1) (1991), 31-42.
[2] H. Y. Chang, R. J. Chen, Incrementally extensible folded hypercube graphs, J. Inf. Sci. Eng., 16(2), (2000), 291-300.
[3] Q. Dong, X. Yang, J. Zhao, Y. Y. Tang, Embedding a family of disjoint 3D meshes into a crossed cube, Inf. Sci. 178 (2008), 2396-2405.
[4] K. Efe, The crossed cube architecture for parallel computation, IEEE Trans. Parallel Distrib. Syst., 40 (1991), 1312-1316.
[5] C. J. Lai, C. H. Tsai, H. C. Hsu, T. K. Li, A dynamic programming algorithm for simulation of a multi-dimensional torus in a crossed cube, Inf. Sci., 180 (2010), 5090-5100.
[6] M. Abd-El-Barr, T. F. Soman, Topological properties of hierarchical interconnection networks a review and comparison, J. Electr. Comput. Eng., (2011).
[7] K. Chose, K. R. Desai, Hierarchical cubic networks, IEEE Trans. Parallel Distrib. Syst., 6 (1995), 427-435.
[8] A. Karci, Hierarchical extended Fibonacci cubes, Iran. J. Sci. Technol. Trans. B Eng., 29 (2005), 117-125.
[9] A. Karci, Hierarchic graphs based on the Fibonacci numbers, Istanbul Univ. J. Electr. Electron. Eng., 7(1) (2007), 345-365.
[10] A. Karcı, B. Selc¸uk, A new hypercube variant: Fractal Cubic Network Graph, Eng. Sci. Technol. an Int. J., 18(1) (2014), 32-41.
[11] B. Selc¸uk, A. Karcı, Connected cubic network graph, Eng. Sci. Technol. an Int. J., 20(3) (2017), 934-943.
[12] E. D. Knuth, Generating all n-tuples, The Art of Computer Programming, Volume 4A: Enumeration and Backtracking, Pre-Fascicle 2a, 2004.
[13] G. Caporossi, I. Gutman, P. Hansen, L. Pavlovi´c, Graphs with maximum connectivity index, Comput. Biol. Chem., 27(1) (2003), 85-90.

There are 13 citations in total.

Details

Primary Language	English
Subjects	Mathematical Sciences
Journal Section	Articles
Authors	Burhan Selçuk
Publication Date	June 30, 2022
Submission Date	January 15, 2022
Acceptance Date	June 1, 2022
Published in Issue	Year 2022 Volume: 5 Issue: 2

Cite

APA	Selçuk, B. (2022). Connected Square Network Graphs. Universal Journal of Mathematics and Applications, 5(2), 57-63. https://doi.org/10.32323/ujma.1058116
AMA	Selçuk B. Connected Square Network Graphs. Univ. J. Math. Appl. June 2022;5(2):57-63. doi:10.32323/ujma.1058116
Chicago	Selçuk, Burhan. “Connected Square Network Graphs”. Universal Journal of Mathematics and Applications 5, no. 2 (June 2022): 57-63. https://doi.org/10.32323/ujma.1058116.
EndNote	Selçuk B (June 1, 2022) Connected Square Network Graphs. Universal Journal of Mathematics and Applications 5 2 57–63.
IEEE	B. Selçuk, “Connected Square Network Graphs”, Univ. J. Math. Appl., vol. 5, no. 2, pp. 57–63, 2022, doi: 10.32323/ujma.1058116.
ISNAD	Selçuk, Burhan. “Connected Square Network Graphs”. Universal Journal of Mathematics and Applications 5/2 (June 2022), 57-63. https://doi.org/10.32323/ujma.1058116.
JAMA	Selçuk B. Connected Square Network Graphs. Univ. J. Math. Appl. 2022;5:57–63.
MLA	Selçuk, Burhan. “Connected Square Network Graphs”. Universal Journal of Mathematics and Applications, vol. 5, no. 2, 2022, pp. 57-63, doi:10.32323/ujma.1058116.
Vancouver	Selçuk B. Connected Square Network Graphs. Univ. J. Math. Appl. 2022;5(2):57-63.

Universal Journal of Mathematics and Applications

Connected Square Network Graphs

Abstract

Keywords

References

Abstract

References

Details

Cite

Cited By

Hamiltonian path, routing, broadcasting algorithms for connected square network graphs

Engineering Science and Technology, an International Journal

https://doi.org/10.1016/j.jestch.2023.101454