The Least Eigenvalue of the Graphs Whose Complements Are Connected and Have Pendent Paths
, , and | May 17, 2018
Published Online: May 17, 2018
Page range: 303 - 308
Received: Jan 27, 2018
Accepted: Mar 16, 2018
DOI: https://doi.org/10.1515/jaiscr-2018-0020
Keywords
© 2018
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 License.
The adjacency matrix of a graph is a matrix which represents adjacent relation between the vertices of the graph. Its minimum eigenvalue is defined as the least eigenvalue of the graph. Let Gn be the set of the graphs of order n, whose complements are connected and have pendent paths. This paper investigates the least eigenvalue of the graphs and characterizes the unique graph which has the minimum least eigenvalue in Gn.