Semigroups, Algebras and Operator Theory

This book contains chapters on a range of topics in mathematics and mathematical physics, including semigroups, algebras, operator theory and quantum mechanics, most of them have been presented at the International Conference on Semigroup, Algebras, and Operator Theory (ICSAOT-22), held at Cochin, Kerala, India, from 2831 March 2022. It highlights the significance of semigroup theory in different areas of mathematics and delves into various themes that demonstrate the subject's diverse nature and practical applications. One of the key features of the book is its focus on the relationship between geometric algebra and quantum mechanics. The book offers both theoretical and numerical approximation results, presenting a comprehensive overview of the subject. It covers a variety of topics, ranging from C-algebraic models to numerical solutions for partial differential equations.

The content of the book is suitable for active researchers and graduate students who are just beginning their studies in the field. It offers insights and practical applications that would be valuable to anyone interested in the mathematical foundations of physics and related fields. Overall, this book provides an excellent resource for anyone seeking to deepen their understanding of the intersections between mathematics and physics.

Collects chapters on semigroup, algebra and operator theory Focuses on the interplay between geometric algebra and quantum mechanics Reveals the importance of semigroup theory in various topics

Auteur
A. A. Ambily is Assistant Professor at the Department of Mathematics, Cochin University of Science and Technology, Kerala, India. She holds a Ph.D. degree in Mathematics from the Indian Statistical Institute, Bangalore Center, India. Her research interests include algebraic K-theory and noncommutative algebras such as Leavitt path algebras and related topics. She has edited a book, Leavitt Path Algebras and Classical K-Theory (by Springer), and contributed more than 10 papers in reputed journals. In 2018, she was awarded a one-year overseas postdoctoral fellowship (SERB-OPDF) by the Science and Engineering Research Board, a statutory body under the Department of Science and Technology, the Government of India. In 2021, she was awarded the Kerala State Young Scientist Award, instituted by the Kerala State Council for Science Technology and Environment, an autonomous body constituted by the Government of Kerala, India.

V. B. Kiran Kumar is Assistant Professor at the Department of Mathematics, Cochin University of Science and Technology, Kerala, India. He holds a Ph.D. degree in Mathematics from the Cochin University of Science and Technology. His research interests include spectral theory, approximation theory, symplectic spectrum and related topics. He has published more than 15 papers in reputed journals. In 2018, he was awarded the Kerala State Young Scientist Award, instituted by the Kerala State Council for Science Technology and Environment, an autonomous body constituted by the Government of Kerala, India.

Contenu

P.A. Azeef Muhammed and C. S. Preenu, Cross-connections in Clifford semigroups.- I.M. Evseev and A.E. Guterman, A range of the multidimensional permanent on (0,1)-matrices.- Nikita V. Kitov and Mikhail V. Volkov, Identities in twisted Brauer monoids.- Alanka Thomas and P.G. Romeo, Group lattices over division rings.- M. N. N. Namboodiri, Structure Of The Semi-group Of Regular Probability Measures On Locally Compact Hausdorff Topological Semiroups.- P. Panjarikea, K. Syam Prasad, M. Al-ahan, V. Bhatta and H. Panackal, On lattice vector spaces over a distributive lattice.- Mark V. Lawson, Non-commutative Stone duality.- A R Rajan, Compatible and Discrete Normal Categories.- S. N. Arjun and P. G. Romeo, On category of Lie algebras.- K.V. Didimos, Application of Geometric Algebra to Koga's Work on Quantum Mechanics.- R. Salvankar, K. Babushri Srinivas, H. Panackal, and K. S. Prasad, Generalised essential submodule graph of an R-module.- A. Babu and N. Asharaf, Numerical solution of one-dimensional hyperbolic telegraph equation using collocation of cubic B-splines.- G. Krishna Kumar and J. Augustine.- (n, )-Condition Spectrum of Operator Pencils.- W. Bauer and R. Fulsche, Resolvent algebra in Fock-Bargmann representation.