Your search keyword '"Adjacency matrix"' showing total 2 results

1. ON GRAPHS WITH ANTI-RECIPROCAL EIGENVALUE PROPERTY.

Author

AKHTER, SADIA, AHMAD, UZMA, and HAMEED, SAIRA

Subjects

*EIGENVALUES, *REGULAR graphs, *UNDIRECTED graphs, *GRAPH connectivity

Abstract

Let A(G) be the adjacency matrix of a simple connected undirected graph G. A graph G of order n is said to be non-singular (respectively singular) if A(G) is non-singular (respectively singular). The spectrum of a graph G is the set of all its eigenvalues denoted by spec(G). The antireciprocal (respectively reciprocal) eigenvalue property for a graph G can be defined as "Let G be a non-singular graph G if the negative reciprocal (respectively positive reciprocal) of each eigenvalue is likewise an eigenvalue of G, then G has anti-reciprocal (respectively reciprocal) eigenvalue property." Furthermore, a graph G is said to have strong anti-reciprocal eigenvalue property (resp. strong reciprocal eigenvalue property) if the eigenvalues and their negative (resp. positive) reciprocals are of same multiplicities. In this article, graphs satisfying anti-reciprocal eigenvalue (or property (-R)) and strong anti-reciprocal eigenvalue property (or property (-SR)) are discussed. [ABSTRACT FROM AUTHOR]

Published

2024

2. SPECTRAL PROPERTIES OF THE NON{PERMUTABILITY GRAPH OF SUBGROUPS.

Author

MUHIE, SEID KASSAW

Subjects

*FINITE groups, *SYLOW subgroups, *CHARTS, diagrams, etc., *LAPLACIAN matrices, *REGULAR graphs

Abstract

Given a finite group G and the subgroups lattice L(G) of G, the \textit{non--permutability graph of subgroups} ΓL(G) is introduced as the graph with vertices in L(G)\CL(G)(L(G)), where CL(G)(L(G)) is the smallest sublattice of L(G) containing all permutable subgroups of G, and edges obtained by joining two vertices X,Y if XY≠YX. Here we study the behaviour of the non-permutability graph of subgroups using algebraic properties of associated matrices such as the adjacency and the Laplacian matrix. Further, we study the structure of some classes of groups whose non-permutability graph is strongly regular. [ABSTRACT FROM AUTHOR]

Published

2022