Free Access
Issue
RAIRO-Oper. Res.
Volume 55, 2021
Regular articles published in advance of the transition of the journal to Subscribe to Open (S2O). Free supplement sponsored by the Fonds National pour la Science Ouverte
Page(s) S1935 - S1947
DOI https://doi.org/10.1051/ro/2020073
Published online 02 March 2021
  • P. Arul Paul Sudhahar, A. Ajitha and A. Subramanian, Edge geodetic domination number of a graph. Int. J. Math. App. 4 (2016) 45–50. [Google Scholar]
  • M. Atici, On the edge geodetic number of a graph. Int. J. Comput. Math. 80 (2003) 853–861. [Google Scholar]
  • F. Buckley and F. Harary, Distance in Graphs. Addison-Wesley, Redwood City, CA (1990). [Google Scholar]
  • F. Harary, Graph Theory. Narosa Publishing House, New Dehli (1998). [Google Scholar]
  • J. John and D. Stalin, Edge geodetic self decomposition of graphs. Disc. Math. Algorithms App. 12 (2020) 2050064. [Google Scholar]
  • R.E. Mariano and S.R. Canoy, Jr., Edge geodetic covers in graphs. Int. Math. Forum 46 (2009) 2301–2310. [Google Scholar]
  • P. Paulraja and S. Ganesamoorthy, Multidecompositions of line graphs of complete graphs. Disc. Math. Algorithms App. 11 (2019) 1950035. [Google Scholar]
  • P. Paulraja and T. Sivakaran, Decompositions of some regular graphs into unicyclic graphs of order five. Disc. Math. Algorithms App. 11 (2019) 1950042. [Google Scholar]
  • V. Samodivkin, On the edge geodetic and edge geodetic domination numbers of a graph. Commun. Comb. Optim. 5 (2019) 41–54. [Google Scholar]
  • A.P. Santhakumaran and J. John, Edge geodetic number of a graph. J. Disc. Math. Sci. Cryptography 10 (2007) 415–432. [Google Scholar]
  • A.P. Santhakumaran and J. John, The connected edge geodetic number of a graph. Scientia 17 (2009) 67–82. [Google Scholar]
  • A.P. Santhakumaran and J. John, The upper edge geodetic number and the forcing edge geodetic number of a graph. Opuscula Math. 29 (2009) 427–441. [Google Scholar]
  • A.P. Santhakumaran and J. John, The upper connected edge geodetic number of a graph. Filomat 26 (2012) 131–141. [Google Scholar]
  • A.P. Santhakumaran and S.V. Ullas Chandran, Comment on “Edge geodetic covers in graphs”. Proyecciones J. Math. 34 (2015) 343–350. [Google Scholar]
  • D. Stalin and J. John, Edge geodetic dominations in graphs. Int. J. Pure Appl. Math. 116 (2017) 31–40. [Google Scholar]
  • D. Stalin and J. John, Forcing edge geodetic dominations in graphs. Int. J. Pure Appl. Math. 10 (2018) 172–177. [Google Scholar]
  • D. Stalin and J. John, Upper edge geodetic dominations in graphs. J. Adv. Res. Dyn. Control Syst. 9 (2018) 201–205. [Google Scholar]
  • F. Zheng, Advanced hybrid approaches based on graph theory decomposition, modified evolutionary algorithm and deterministic optimisation techniques for the design of water distribution systems, Ph.D. thesis. The University of Adelaide (2013). [Google Scholar]
  • F. Zheng, A.C. Zecchin and A.R. Simpson, A decomposition and multistage optimization approach applied to the optimization of water distribution systems with multiple supply sources. Water Resour. Res. 49 (2012) 380–399. [Google Scholar]

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