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Extremal Iota Energy Of A Subclass Of Tricyclic Digraphs And Sidigraphs

Author

Listed:
  • Fareeha Jamal

    (School of Natural Sciences, National University of Sciences and Technology, Islamabad, Pakistan.)

  • Mehtab Khan

    (Department of Mathematics & Statistics, Bacha Khan University Charsadda, Pakistan.Author-Name: Farhad Ali)

Abstract

The iota energy of an n-vertex digraph D is defined by Ec (𝐷) = ∑ 􀀀1 |Im(𝑧 k)|, where z1, . . ., zn are eigenvalues of D and Im(zk) is the imaginary part of eigenvalue zk . The iota energy of an n-vertex sidigraph can be defined analogously. In this paper, we define a class Fn of n-vertex tricyclic digraphs containing five linear subdigraphs such that one of the directed cycles does not share any vertex with the other two directed cycles and the remaining two directed cycles are of same length sharing at least one vertex. We find the digraphs in Fn with minimal and maximal iota energy. We also consider a similar class of tricyclic sidigraphs and find extremal values of iota energy among the sidigraphs in this class.

Suggested Citation

  • Fareeha Jamal & Mehtab Khan, 2018. "Extremal Iota Energy Of A Subclass Of Tricyclic Digraphs And Sidigraphs," Matrix Science Mathematic (MSMK), Zibeline International Publishing, vol. 2(2), pages 40-49, January.
    • Handle: RePEc:zib:zbmsmk:v:2:y:2018:i:2:p:40-49
    DOI: 10.26480/msmk.02.2018.40.49
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