Several Topological Invariants of Generalized Möbius Ladder

Muhammad Idrees; Hongbin Ma; Numan Amin; Abdul Rauf Nizami; Zaffar Iqbal; Saiid Ali

doi:10.23919/ChiCC.2018.8484170

Several Topological Invariants of Generalized Möbius Ladder

Muhammad Idrees, Hongbin Ma^*, Numan Amin, Abdul Rauf Nizami, Zaffar Iqbal, Saiid Ali

^*Corresponding author for this work

School of Automation

Research output: Contribution to journal › Conference article › peer-review

Abstract

The Hosoya polynomial of a graph G was introduced by H. Hosoya in 1988 as a counting polynomial, which actually counts the number of distances of paths of different lengths in G. The most interesting application of the Hosoya polynomial is that almost all distance-based graph invariants, which are used to predict physical, chemical and pharmacological properties of organic molecules, can be recovered from it. In this article we give the general closed form of the Hosoya polynomial of the generalized Möbius ladder M(m, n) for arbitrary m and for n=3. Moreover, we recover Wiener, hyper Wiener, Tratch-Stankevitch-Zefirov, and Harary indices from it.

Original language	English
Article number	8484170
Pages (from-to)	7328-7333
Number of pages	6
Journal	Chinese Control Conference, CCC
Volume	2018-January
DOIs	https://doi.org/10.23919/ChiCC.2018.8484170
Publication status	Published - 2018
Event	37th Chinese Control Conference, CCC 2018 - Wuhan, China Duration: 25 Jul 2018 → 27 Jul 2018

Keywords

Generalized Möbius ladder
Hosoya polynomial
Topological indices

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10.23919/ChiCC.2018.8484170

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title = "Several Topological Invariants of Generalized M{\"o}bius Ladder",

abstract = "The Hosoya polynomial of a graph G was introduced by H. Hosoya in 1988 as a counting polynomial, which actually counts the number of distances of paths of different lengths in G. The most interesting application of the Hosoya polynomial is that almost all distance-based graph invariants, which are used to predict physical, chemical and pharmacological properties of organic molecules, can be recovered from it. In this article we give the general closed form of the Hosoya polynomial of the generalized M{\"o}bius ladder M(m, n) for arbitrary m and for n=3. Moreover, we recover Wiener, hyper Wiener, Tratch-Stankevitch-Zefirov, and Harary indices from it.",

keywords = "Generalized M{\"o}bius ladder, Hosoya polynomial, Topological indices",

author = "Muhammad Idrees and Hongbin Ma and Numan Amin and Nizami, {Abdul Rauf} and Zaffar Iqbal and Saiid Ali",

note = "Publisher Copyright: {\textcopyright} 2018 Technical Committee on Control Theory, Chinese Association of Automation.; 37th Chinese Control Conference, CCC 2018 ; Conference date: 25-07-2018 Through 27-07-2018",

year = "2018",

doi = "10.23919/ChiCC.2018.8484170",

language = "English",

volume = "2018-January",

pages = "7328--7333",

journal = "Chinese Control Conference, CCC",

issn = "1934-1768",

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TY - JOUR

T1 - Several Topological Invariants of Generalized Möbius Ladder

AU - Idrees, Muhammad

AU - Ma, Hongbin

AU - Amin, Numan

AU - Nizami, Abdul Rauf

AU - Iqbal, Zaffar

AU - Ali, Saiid

PY - 2018

Y1 - 2018

N2 - The Hosoya polynomial of a graph G was introduced by H. Hosoya in 1988 as a counting polynomial, which actually counts the number of distances of paths of different lengths in G. The most interesting application of the Hosoya polynomial is that almost all distance-based graph invariants, which are used to predict physical, chemical and pharmacological properties of organic molecules, can be recovered from it. In this article we give the general closed form of the Hosoya polynomial of the generalized Möbius ladder M(m, n) for arbitrary m and for n=3. Moreover, we recover Wiener, hyper Wiener, Tratch-Stankevitch-Zefirov, and Harary indices from it.

AB - The Hosoya polynomial of a graph G was introduced by H. Hosoya in 1988 as a counting polynomial, which actually counts the number of distances of paths of different lengths in G. The most interesting application of the Hosoya polynomial is that almost all distance-based graph invariants, which are used to predict physical, chemical and pharmacological properties of organic molecules, can be recovered from it. In this article we give the general closed form of the Hosoya polynomial of the generalized Möbius ladder M(m, n) for arbitrary m and for n=3. Moreover, we recover Wiener, hyper Wiener, Tratch-Stankevitch-Zefirov, and Harary indices from it.

KW - Generalized Möbius ladder

KW - Hosoya polynomial

KW - Topological indices

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U2 - 10.23919/ChiCC.2018.8484170

DO - 10.23919/ChiCC.2018.8484170

M3 - Conference article

AN - SCOPUS:85062702419

SN - 1934-1768

VL - 2018-January

SP - 7328

EP - 7333

JO - Chinese Control Conference, CCC

JF - Chinese Control Conference, CCC

M1 - 8484170

T2 - 37th Chinese Control Conference, CCC 2018

Y2 - 25 July 2018 through 27 July 2018

ER -

Several Topological Invariants of Generalized Möbius Ladder

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Keywords

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