MATI
New Bounds for the Harary Energy and Harary Estrada index of Graphs
Yazarlar: Akbar JAHANBANİ
Cilt 1 , Sayı 1 , 2019 , Sayfalar 40 - 51
Konular:Matematik
Anahtar Kelimeler:Eigenvalue of graph,Harary Energy,Spectral radius
Özet: The harary index is defined as the sum of reciprocal distances between all pairs of vertices in a nontrivial connected graph. In this paper, we establish upper and lower bounds for the harary energy and harary Estrada index in terms of graph invariants such as the number of vertices, the number degree sequence and spectral radius.
ATIFLAR
Atıf Yapan Eserler
KAYNAK GÖSTER
BibTex
KOPYALA
@article{2019, title={New Bounds for the Harary Energy and Harary Estrada index of Graphs}, volume={1}, number={1}, publisher={MATI}, author={Akbar JAHANBANİ}, year={2019}, pages={40–51} }
APA
KOPYALA
Akbar JAHANBANİ. (2019). New Bounds for the Harary Energy and Harary Estrada index of Graphs (Vol. 1, pp. 40–51). Vol. 1, pp. 40–51. MATI.
MLA
KOPYALA
Akbar JAHANBANİ. New Bounds for the Harary Energy and Harary Estrada Index of Graphs. no. 1, MATI, 2019, pp. 40–51.