Even vertex odd edge root square mean labeling of some cycle-related graphs

Authors

  • K. N. Babu
    Department of Mathematics, Vels Institute of Science, Technology and Advanced Studies (VISTAS), Chennai – 600 117, Tamil Nadu, India
    Sri Malolan College of Arts and Science, Madurantakam – 603 306, Tamil Nadu, India
  • S. Meenakshi
    Department of Mathematics, Vels Institute of Science, Technology and Advanced Studies (VISTAS), Chennai – 600 117, Tamil Nadu, India

Keywords:

EVOERSML, Graph, Cycle, Ladder, Sunlet

Abstract

An injective mapping (f:V(G)\rightarrow \{0,2,4,...,2|E|\}\) is said to satisfy the even vertex odd edge root square mean labeling (EVOERSML) condition when vertices are assigned distinct even values and each edge \(uv\in E(G)\) receives a distinct odd label determined by \( \left\lceil \sqrt{\frac{f(u)2+f(v)2}\{2}} \right\rceil \quad or \quad \left\lfloor \sqrt{\frac{f(u)2+f(v)2}\{2}} \right\rfloor.\) Graphs that admit such assignments are called EVOERSML graphs. The present study examines this labeling scheme on several graph structures closely related to cycles. Constructive methods are provided for families including ladder graphs, tadpole graphs, polygon-chain graphs, dumbbell graphs, and sunlet graphs. The obtained results emphasize how parity restrictions influence labeling existence and uniqueness. This work enriches the theory of root square mean labeling and opens further scope for studying EVOERSML-type labelings in more complex graph families and applied network models.

Dimensions

[1] S. S. Sandhya, S. Somasundaram & S. Anusa, ``Root square mean labeling of graphs'', International Journal of Contemporary Mathematical Sciences 9 (2014) 667. https://doi.org/10.12988/ijcms.2014.410105.

[2] K. Thirugnanasambandam & K. Venkatesan, ``Super root square mean labeling of graph'', International Journal of Mathematics and Soft Computing 5 (2015) 189. https://www.researchgate.net/publication/321164979_Super_Root_Square_Mean_Labeling_of_Graphs.

[3] M. J. M. Orias & A. C. Pedrano, ``On super root square mean labeling of some cycle related graphs'', Acta Scientific Computer Sciences 5 (2023) 40. https://actascientific.com/ASCS/pdf/ASCS-05-0376.pdf.

[4] K. Venkatesan & K. Thirugnanasambandam, ``Super root square mean labeling of some cycle related graphs'', Global Journal of Engineering Science and Researches 5 (2018) 221. https://doi.org/10.5281/zenodo.1495607.

[5] J. A. Gallian, ``A dynamic survey of graph labeling'', The Electronic Journal of Combinatorics 18 (2015) DS6. https://www.combinatorics.org/files/Surveys/ds6/ds6v18-2015.pdf.

[6] V. Senthilkumar & K. Venkatesan, ``Odd vertex even edge root square mean labelling graphs'', Journal of Interdisciplinary Mathematics 27 (2024) 1001. https://doi.org/10.47974/JIM-1923.

[7] K. N. Babu & S. Meenakshi, ``Even vertex odd edge root square mean labelling of path related graphs'', Communications on Applied Nonlinear Analysis 32 (2025) 296. https://doi.org/10.52783/cana.v32.2401.

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Published

2026-07-07

How to Cite

Even vertex odd edge root square mean labeling of some cycle-related graphs. (2026). Journal of the Nigerian Society of Physical Sciences, 8(3), 3293. https://doi.org/10.46481/jnsps.2026.3293

Issue

Section

Mathematics & Statistics

How to Cite

Even vertex odd edge root square mean labeling of some cycle-related graphs. (2026). Journal of the Nigerian Society of Physical Sciences, 8(3), 3293. https://doi.org/10.46481/jnsps.2026.3293

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