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Strong Equality of Perfect Roman and Weak Roman Domination in Trees

Author

Listed:
  • Abdollah Alhevaz

    (Faculty of Mathematical Sciences, Shahrood University of Technology, P.O. Box 316-3619995161, Shahrood, Iran)

  • Mahsa Darkooti

    (Faculty of Mathematical Sciences, Shahrood University of Technology, P.O. Box 316-3619995161, Shahrood, Iran)

  • Hadi Rahbani

    (Faculty of Mathematical Sciences, Shahrood University of Technology, P.O. Box 316-3619995161, Shahrood, Iran)

  • Yilun Shang

    (Department of Computer and Information Sciences, Northumbria University, Newcastle NE1 8ST, UK)

Abstract

Let G = ( V , E ) be a graph and f : V ⟶ { 0 , 1 , 2 } be a function. Given a vertex u with f ( u ) = 0 , if all neighbors of u have zero weights, then u is called undefended with respect to f . Furthermore, if every vertex u with f ( u ) = 0 has a neighbor v with f ( v ) > 0 and the function f ′ : V ⟶ { 0 , 1 , 2 } with f ′ ( u ) = 1 , f ′ ( v ) = f ( v ) − 1 , f ′ ( w ) = f ( w ) if w ∈ V ∖ { u , v } has no undefended vertex, then f is called a weak Roman dominating function. Also, the function f is a perfect Roman dominating function if every vertex u with f ( u ) = 0 is adjacent to exactly one vertex v for which f ( v ) = 2 . Let the weight of f be w ( f ) = ∑ v ∈ V f ( v ) . The weak (resp., perfect) Roman domination number, denoted by γ r ( G ) (resp., γ R p ( G ) ), is the minimum weight of the weak (resp., perfect) Roman dominating function in G . In this paper, we characterize those trees where the perfect Roman domination number strongly equals the weak Roman domination number, in the sense that each weak Roman dominating function of minimum weight is, at the same time, perfect Roman dominating.

Suggested Citation

  • Abdollah Alhevaz & Mahsa Darkooti & Hadi Rahbani & Yilun Shang, 2019. "Strong Equality of Perfect Roman and Weak Roman Domination in Trees," Mathematics, MDPI, vol. 7(10), pages 1-13, October.
  • Handle: RePEc:gam:jmathe:v:7:y:2019:i:10:p:997-:d:278584
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    References listed on IDEAS

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    1. Mahsa Darkooti & Abdollah Alhevaz & Sadegh Rahimi & Hadi Rahbani, 2019. "On perfect Roman domination number in trees: complexity and bounds," Journal of Combinatorial Optimization, Springer, vol. 38(3), pages 712-720, October.
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    Cited by:

    1. Zehui Shao & Saeed Kosari & Mustapha Chellali & Seyed Mahmoud Sheikholeslami & Marzieh Soroudi, 2020. "On a Relation between the Perfect Roman Domination and Perfect Domination Numbers of a Tree," Mathematics, MDPI, vol. 8(6), pages 1-13, June.

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