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The Harary index of a graph[electron...

Das, Kinkar Ch.

The Harary index of a graph[electronic resource] /

レコード種別:	言語・文字資料 (印刷物) : 単行資料
[NT 15000414] null:	511.5
タイトル / 著者:	The Harary index of a graph/ by Kexiang Xu, Kinkar Ch. Das, Nenad Trinajstic.
著者:	Xu, Kexiang.
その他の著者:	Das, Kinkar Ch.
出版された:	Berlin, Heidelberg : : Springer Berlin Heidelberg :, 2015.
記述:	xv, 74 p. : : ill., digital ;; 24 cm.
含まれています:	Springer eBooks
主題:	Graph theory.
主題:	Mathematics.
主題:	Graph Theory.
主題:	Combinatorics.
主題:	Math. Applications in Chemistry.
国際標準図書番号 (ISBN) :	9783662458433 (electronic bk.)
国際標準図書番号 (ISBN) :	9783662458426 (paper)
[NT 15000228] null:	Introduction -- Extremal Graphs with Respect to Harary Index -- Relation Between the Harary Index and Related Topological Indices -- Some Properties and Applications of Harary Index -- The Variants of Harary Index -- Open Problems.
[NT 15000229] null:	This is the first book to focus on the topological index, the Harary index, of a graph, including its mathematical properties, chemical applications and some related and attractive open problems. This book is dedicated to Professor Frank Harary (1921—2005), the grandmaster of graph theory and its applications. It has be written by experts in the field of graph theory and its applications. For a connected graph G, as an important distance-based topological index, the Harary index H(G) is defined as the sum of the reciprocals of the distance between any two unordered vertices of the graph G. In this book, the authors report on the newest results on the Harary index of a graph. These results mainly concern external graphs with respect to the Harary index; the relations to other topological indices; its properties and applications to pure graph theory and chemical graph theory; and two significant variants, i.e., additively and multiplicatively weighted Harary indices. In the last chapter, we present a number of open problems related to the Harary index. As such, the book will not only be of interest to graph researchers, but to mathematical chemists as well.
電子資源:	http://dx.doi.org/10.1007/978-3-662-45843-3

The Harary index of a graph[electronic resource] /
Xu, Kexiang.

The Harary index of a graph[electronic resource] /by Kexiang Xu, Kinkar Ch. Das, Nenad Trinajstic. - Berlin, Heidelberg :Springer Berlin Heidelberg :2015. - xv, 74 p. :ill., digital ;24 cm. - SpringerBriefs in applied sciences and technology,2191-530X. - SpringerBriefs in applied sciences and technology..

Introduction -- Extremal Graphs with Respect to Harary Index -- Relation Between the Harary Index and Related Topological Indices -- Some Properties and Applications of Harary Index -- The Variants of Harary Index -- Open Problems.

This is the first book to focus on the topological index, the Harary index, of a graph, including its mathematical properties, chemical applications and some related and attractive open problems. This book is dedicated to Professor Frank Harary (1921—2005), the grandmaster of graph theory and its applications. It has be written by experts in the field of graph theory and its applications. For a connected graph G, as an important distance-based topological index, the Harary index H(G) is defined as the sum of the reciprocals of the distance between any two unordered vertices of the graph G. In this book, the authors report on the newest results on the Harary index of a graph. These results mainly concern external graphs with respect to the Harary index; the relations to other topological indices; its properties and applications to pure graph theory and chemical graph theory; and two significant variants, i.e., additively and multiplicatively weighted Harary indices. In the last chapter, we present a number of open problems related to the Harary index. As such, the book will not only be of interest to graph researchers, but to mathematical chemists as well.

ISBN: 9783662458433 (electronic bk.)

Standard No.: 10.1007/978-3-662-45843-3doiSubjects--Topical Terms:

381176
Graph theory.

LC Class. No.: QA166

Dewey Class. No.: 511.5

The Harary index of a graph[electronic resource] /
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245 1 4 $a The Harary index of a graph $h [electronic resource] / $c by Kexiang Xu, Kinkar Ch. Das, Nenad Trinajstic.
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505 0 $a Introduction -- Extremal Graphs with Respect to Harary Index -- Relation Between the Harary Index and Related Topological Indices -- Some Properties and Applications of Harary Index -- The Variants of Harary Index -- Open Problems.
520 $a This is the first book to focus on the topological index, the Harary index, of a graph, including its mathematical properties, chemical applications and some related and attractive open problems. This book is dedicated to Professor Frank Harary (1921—2005), the grandmaster of graph theory and its applications. It has be written by experts in the field of graph theory and its applications. For a connected graph G, as an important distance-based topological index, the Harary index H(G) is defined as the sum of the reciprocals of the distance between any two unordered vertices of the graph G. In this book, the authors report on the newest results on the Harary index of a graph. These results mainly concern external graphs with respect to the Harary index; the relations to other topological indices; its properties and applications to pure graph theory and chemical graph theory; and two significant variants, i.e., additively and multiplicatively weighted Harary indices. In the last chapter, we present a number of open problems related to the Harary index. As such, the book will not only be of interest to graph researchers, but to mathematical chemists as well.
650 0 $a Graph theory. $3 381176
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650 2 4 $a Graph Theory. $3 466209
650 2 4 $a Combinatorics. $3 464913
650 2 4 $a Math. Applications in Chemistry. $3 464489
700 1 $a Das, Kinkar Ch. $3 606456
700 1 $a Trinajstic, Nenad. $3 606457
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950 $a Mathematics and Statistics (Springer-11649)

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