The IRMA Community
Newsletters
Research IRM
Click a keyword to search titles using our InfoSci-OnDemand powered search:
|
S. Balachandran
Dr.
Selvaraj Balachandran
is an accomplished mathematician and researcher specializing in graph theory and topological indices. He is currently serving as an Assistant Professor of Mathematics in the Department of Mathematics at SASTRA University, Thanjavur, India, where he has been on the faculty since 2006. He earned his Ph.D. in Mathematics from SASTRA University in 2014 under the supervision of Dr. S.K. Ayyaswamy, with his doctoral thesis focusing on A Study on Energy and Indices of Graphs. Earlier, he completed his M.Phil. in Mathematics from Bharathidasan University (2002), his M.Sc. in Mathematics from A.V.C. College, Bharathidasan University (2000), and his B.Sc. in Mathematics from the same institution in 1997. From 2017 to 2020, Dr. Balachandran worked as a Postdoctoral Researcher at the University of the Free State, Bloemfontein, South Africa, under the mentorship of Prof. Tomas Vetrik. His research continues to center on topological indices of graphs and graph theory, with numerous contributions to extremal problems and chemical graph theory. He has been actively involved in the global mathematical community as a reviewer for several international journals, including Ars Combinatoria, Applied Mathematics and Computation, Discrete Applied Mathematics, Graphs and Combinatorics, Journal of Combinatorial Optimization, and others. A prolific researcher, Dr. Balachandran has authored and co-authored numerous publications in high-impact journals, addressing topics such as Zagreb indices, Randic indices, Sombor indices, harmonic indices, and other mathematical measures associated with graph theory. His works often focus on extremal problems, chemical graph theory, and structural properties of trees, unicyclic, and bicyclic graphs. Through his extensive research, teaching, and professional activities, Dr. Selvaraj Balachandran has established himself as a dedicated scholar in mathematics, particularly in the field of graph theory, contributing significantly to both theoretical advancements and applications.
|
|