Walikar, H. B. and Acharya, B. D. and Shirkol, Shailaja S. (2010) Designs associated with maximum independent sets of a graph. Designs Codes and Cryptography, 57 (1). pp. 91-105. ISSN 1573-7586
![[img]](http://eprints.uni-mysore.ac.in/style/images/fileicons/text.png) |
Text (Full Text)
Walikar2010_Article_DesignsAssociatedWithMaximumIn.pdf - Published Version Restricted to Registered users only Download (624kB) | Request a copy |
Abstract
A (v, beta (o) , mu)-design over regular graph G = (V, E) of degree d is an ordered pair D = (V, B), where |V| = v and B is the set of maximum independent sets of G called blocks such that if i, j a V, i not equal j and if i and j are not adjacent in G then there are exactly mu blocks containing i and j. In this paper, we study (v, beta (o) , mu)-designs over the graphs K (n) x K (n) , T(n)-triangular graphs, L (2)(n)-square lattice graphs, Petersen graph, Shrikhande graph, Clebsch graph and the Schlafli graph and non-existence of (v, beta (o) , mu)-designs over the three Chang graphs T (1)(8), T (2)(8) and T (3)(8).
| Item Type: | Article |
|---|---|
| Uncontrolled Keywords: | Designs; Independence number; Matching polynomial |
| Subjects: | D Physical Science > Computer Science |
| Divisions: | Department of > Computer Science |
| Depositing User: | LA manjunath user |
| Date Deposited: | 29 Jun 2019 06:10 |
| Last Modified: | 08 Jul 2022 06:44 |
| URI: | http://eprints.uni-mysore.ac.in/id/eprint/4120 |
Actions (login required)
 |
View Item |
