On (k, D)-Maximum Indexable Graphs and (k, D)-Maximum Arithmetic Graphs

Khoshbakht, Zeynab (2012) On (k, D)-Maximum Indexable Graphs and (k, D)-Maximum Arithmetic Graphs. International Journal of Mathematical Combinatorics, 2. pp. 81-88. ISSN 1937 - 1055

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Abstract

A (n,m) graph G is said to be (k, d) maximum indexable graph, if its vertices can be assigned distinct integers 0, 1, 2, · · · , n - 1, so that the values of the edges, obtained as the sum of the numbers assigned to their end vertices and maximum of them can be arranged in the arithmetic progression k, k + 1, k + 2d, · · · , k + (m - 1)d and also a (n,m) graph G is said to be (k, d) maximum arithmetic graph, if its vertices can be assigned distinct non negative integers so that the values of the edges, obtained as the sum of the numbers assigned to their end vertices and maximum of them can be arranged in the arithmetic progression k, k + 1, k + 2d, · · · , k + (m - 1)d. The energy E(G) of a graph G is equal to the sum of the absolute values of the eigenvalues of G. In this paper we introduce some families of graphs which are (k, d)- maximum indexable and (k, d)-maximum arithmetic and also compute energies of some of the

Item Type: Article
Subjects: E Mathematical Science > Mathematics
Divisions: Department of > Mathematics
Depositing User: C Swapna Library Assistant
Date Deposited: 28 Aug 2019 06:10
Last Modified: 28 Aug 2019 06:10
URI: http://eprints.uni-mysore.ac.in/id/eprint/7213

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