EDP Sciences logo
Subscriber Authentication Point
Sciengine logo
Search
Menu
All issues Volume 60 / No 3 (May-June 2026) RAIRO-Oper. Res., 60 3 (2026) 1419-1437 References
Open Access
Issue
RAIRO-Oper. Res.
Volume 60, Number 3, May-June 2026
Page(s) 1419 - 1437
DOI https://doi.org/10.1051/ro/2026032
Published online 20 May 2026
  • A.M. Akbar and V.J. Vernold, Harmonious chromatic number of central graph of complete graph families. J. Comb. Inf. Syst. Sci. 32 (2007) 1–4. [Google Scholar]
  • A. Alsinai, A. Alwardi, H. Ahmed and N.D. Soner, Leap Zagreb indices for the Central graph of graph. J. Prime Res. Math. 17 (2021) 73–78. [Google Scholar]
  • L.A. Basilio, S. Bermudo and J.M. Sigarreta, Bounds on the differential of a graph. Util. Math. 103 (2017) 319–334. [Google Scholar]
  • L.A. Basilio, J. Castro-SimĂłn, J. Leaños and O. Rosario, The differential on graph operator Q(G). Symmetry 12 (2020) 751. [Google Scholar]
  • L.A. Basilio, S. Bermudo, J. Leaños and J.M. Sigarreta, The differential of the line graph L(G). Discret. Appl. Math. 321 (2022) 82–89. [Google Scholar]
  • L.A. Basilio, J. Castro-SimĂłn, G. Reyna and O. Rosario, The differential on operator đť’®(Γ). Math. Biosci. Eng. 20 (2023) 11568–11584. [Google Scholar]
  • L.A. Basilio, J. Leaños, O. Rosario and J.M. Sigarreta, The differential on graph operator R(G). RAIRO-Oper. Res. 58 (2024) 5467–5479. [Google Scholar]
  • S. Bermudo, Total domination on tree operators. Mediterr. J. Math. 20 (2023) 42. [Google Scholar]
  • S. Bermudo and H. Fernau, Lower bound on the differential of a graph. Discret. Math. 312 (2012) 3236–3250. [Google Scholar]
  • S. Bermudo, L. De la Torre, A.M. MartĂ­n-Caraballo and J.M. Sigarreta, The differential of the strong product graphs. Int. J. Comput. Math. 92 (2015) 1124–1134. [Google Scholar]
  • S. Bermudo, J.M. RodrĂ­guez and J.M. Sigarreta, On the differential in graphs. Util. Math. 97 (2015) 257–270. [Google Scholar]
  • A.R. Bindusree, I.N. Cangul, V. Lokesha and A.S. Cevik, Zagreb polynomials of three graph operators. Filomat 30 (2016) 1979–1986. [CrossRef] [MathSciNet] [Google Scholar]
  • A. Cabrera MartĂ­nez and J.A. RodrĂ­guez-Velázquez, From the strong differential to Italian domination in graphs. Mediterr. J. Math. 18 (2021) 1–19. [Google Scholar]
  • A. Cabrera MartĂ­nez and J.A. RodrĂ­guez-Velázquez, On the perfect differential of a graph. Quaest. Math. 45 (2022) 327–345. [Google Scholar]
  • A. Cabrera-MartĂ­nez, S. Cabrera GarcĂ­a and J.A. RodrĂ­guez-Velázquez, Double domination in lexicographic product graphs. Discret. Appl. Math. 284 (2020) 290–300. [Google Scholar]
  • A. Cabrera MartĂ­nez, A. Estrada-Moreno and J.A. RodrĂ­guez-Velázquez, From the quasi-total strong differential to quasi-total Italian domination in graphs. Symmetry 13 (2021) 1036. [Google Scholar]
  • A. Cabrera MartĂ­nez, M.L. Puertas and J.A. RodrĂ­guez, On the 2-packing differential of a graph. Results Math. 76 (2021) 1–24. [Google Scholar]
  • W. Carballosa, J.M. RodrĂ­guez, J.M. Sigarreta and M. Villeta, On the hyperbolicity constant of line graphs. Electron. J. Comb. 18 (2011) 210. [Google Scholar]
  • D.M. Cvetkocic, M. Doob and H. Sachs, Spectra of Graphs: Theory and Application. Vol. 10. Academic Press, New York (1980). [Google Scholar]
  • M.R. Farahani, W. Gao, M.F. Nadeem, S. Zafar and Z. Zahid, On the para-line graphs of certain nanostructures based on topological indices. Sci. Bull. Series B: Chem. Mater. Sci. 79 (2017) 93–104. [Google Scholar]
  • M.R. Farahani, M.F. Nadeem, S. Zafar, Z. Zahid and X. Zhang, Study of the para-line graphs of certain polyphenyl chains using topological indices. Int. J. Biochem. Biotech. 8 (2017) 2435–2442. [Google Scholar]
  • S. Fujita, F. Kazemnejad and B. Pahlavsay, New classification of graphs in view of the domination number of central graphs. Preprint arXiv: 2204.10292 (2022). [Google Scholar]
  • T. Gallai, Ăśber extreme Punkt-und Kantenmengen. Ann. Univ. Sci. Budapest, Eötvös Sect. Math. 2 (1959) 133–138. [Google Scholar]
  • F. Harary and R.Z. Norman, Some properties of line digraphs. Rend. Circ. Mat. Palermo 9 (1960) 161–168. [Google Scholar]
  • F. Kazemnejad and S. Moradi, Total domination number of central graphs. Bull. Korean Math. Soc. 56 (2019) 1059–1075. [Google Scholar]
  • D. Kempe, J. Kleinberg and E. Tardos, Maximizing the spread of influence through a social network, in Proceedings of the Ninth ACM SIGKDD International Conference on Knowledge Discovery and Data Mining (2003) 137–146. [Google Scholar]
  • D. Kempe, J. Kleinberg and E. Tardos, Influential nodes in a diffusion model for social networks, in International Colloquium on Automata, Languages, and Programming. Springer Berlin Heidelberg, Berlin, Heidelberg (2005) 1127–1138. [Google Scholar]
  • K. Kim, On the D-differential of a graph. AKCE Int. J. Graphs Comb. 19 (2022) 325–329. [Google Scholar]
  • J. Krausz, DĂ©monstration nouvelle d’une thĂłreme de Whitney sur les rĂ©seaux. Mat. Fiz. Lapok 50 75–85. [Google Scholar]
  • J.L. Mashburn, T.W. Haynes, S.M. Hedetniemi, S.T. Hedetniemi and P.J. Slater, Differentials in graphs. Util. Math. 69 (2006) 43–54. [Google Scholar]
  • J.A. MĂ©ndez-BermĂşdez, R. Reyes, J.M. RodrĂ­guez and J.M. Sigarreta, Hyperbolicity on graph operators. Symmetry 10 (2018) 360. [Google Scholar]
  • J.A. MĂ©ndez-BermĂşdez, R. Reyes, J.M. RodrĂ­guez and J.M. Sigarreta, Recent results on hyperbolicity on unitary operators on graphs. Discret. Math. Lett. 11 (2023) 99–110. [Google Scholar]
  • A. Michalski and P. Bednarz, On independent secondary dominating sets in generalized graph products. Symmetry 13 (2021) 2399. [Google Scholar]
  • T. PerĂłn, B. Messias, F. Resende, F.A. Rodrigues, L. da F. Costa and J.A. MĂ©ndez-BermĂşdez, Spacing ratio characterization of the spectra of directed random networks. Phys. Rev. E 102 (2020) 062305. [Google Scholar]
  • E. Prisner, Graph Dynamics. Vol. 338. CRC Press (1995). [Google Scholar]
  • P.R.L. Pushpam and D. Yokesh, Differential in certain classes of graphs. Tamkang J. Math. 41 (2010) 129–138. [Google Scholar]
  • P.S. Ranjini and V. Lokesha, SK indices of graph operator S(G) and R(G) on few nanostructures. Montes Taurus J. Pure Appl. Math. 2 (2020) 38–44. [Google Scholar]
  • M.A. Rashid, S. Ahmad, M.K. Siddiqui and M. Imran, Topological properties of para-line graphs for chemical networks. Polycycl. Aromat. Compd. 42 (2022) 260–276. [Google Scholar]
  • V. Samodivkin, Domination related parameters in the generalized lexicographic product of graphs. Discret. Appl. Math. 300 (2021) 77–84. [Google Scholar]
  • J.M. Sigarreta, Differential in Cartesian product graphs. ARS Comb. 126 (2016) 259–267. [Google Scholar]
  • J.M. Sigarreta, Total domination on some graph operators. Mathematics 9 (2021) 241. [Google Scholar]
  • S. Sudha and K. Manikandan, Total coloring of central graphs of a path, a cycle and a star. Int. J. Sci. Innov. Math. Res. 5 (2017) 15–22. [Google Scholar]
  • J. Vernold Vivin and K. Thilagavathi, On harmonious colouring of line graph of central graph of paths. Appl. Math. Sci. 3 (2009) 205–214. [Google Scholar]

Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.

Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.

Initial download of the metrics may take a while.