Ratio Mathematica (Dec 2022)

The Forcing Geodetic Cototal Domination Number of a Graph

  • S L Sumi,
  • V Mary Gleeta,
  • J Befija Minnie

DOI
https://doi.org/10.23755/rm.v44i0.895
Journal volume & issue
Vol. 44, no. 0
pp. 93 – 99

Abstract

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Let be a geodetic cototal domination set of . A subset is called a forcing subset for if is the unique minimum geodetic cototal domination set containing . The minimum cardinality T is the forcing geodetic cototal domination number of S is denotedby , is the cardinality of a minimum forcing subset of S. The forcing geodetic cototal domination number of ,denoted by , is , where the minimum is takenover all -sets in . Some general properties satisfied by this concept arestudied. It is shown that for every pair of integers with ,there exists a connected graph such that and . where isthe geodetic cototal dominating number of .

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