November 22, 2024
Reza Sharafdini

Reza Sharafdini

Academic Rank: Associate professor
Address:
Degree: Ph.D in Mathematics - Algebra
Phone: 77-31222750
Faculty: Faculty of Intelligent Systems and Data Science

Research

Title Tarantula graphs are determined by their Laplacian spectrum
Type Article
Keywords
tarantula graph; Laplacian matrix; Laplacian spectrum; L-cospectral
Journal ELECTRONIC JOURNAL OF GRAPH THEORY AND APPLICATIONS
DOI http://dx.doi.org/10.5614/ejgta.2021.9.2.14
Researchers Reza Sharafdini (First researcher) ,

Abstract

A graph G is said to be determined by its Laplacian spectrum (DLS) if every graph with the same Laplacian spectrum is isomorphic to G. A graph which is a collection of hexagons (lengths of these cycles can be different) all sharing precisely one vertex is called a spinner graph. A tree with exactly one vertex of degree greater than 2 is called a starlike tree. If a spinner graph and a starlike tree are joined by merging their vertices of degree greater than 2, then the resulting graph is called a tarantula graph. It is known that spinner graphs and starlike trees are DLS. In this paper, we prove that tarantula graphs are determined by their Laplacian spectrum.