Cameron University’s Dr. Ioannis Argyros, professor of mathematics, is the co-author of “Contemporary Algorithms: Theory and Applications Volume III,” a new edition to the Mathematics Research Developments Series published by Nova Science Publishers. Argyros wrote the textbook with Dr. Santhosh George, professor of mathematical and computational sciences at the National Institute of Technology in Karnataka, India.
Researchers on the project included 2023 CU graduate Christopher Argyros, Lawton, and Samundra Regmi, Irving, Texas. Christopher Argyros is a software engineer for OASYS, Inc. at Fort Sill. He will be pursuing a graduate degree in Spring 2024 at Georgia Tech. Regmi is a 2019 CU alumnus who is pursuing a doctorate at the University of Houston.
The book provides different avenues to study algorithms and also brings new techniques and methodologies to problem-solving in computational sciences, engineering, scientific computing and medicine (imaging, radiation therapy). A plethora of algorithms which are universally applicable is presented in a sound analytical way. The chapters are written independently of each other, so they can be understood without reading earlier chapters. Some knowledge of analysis and linear algebra as well as some computing experience is recommended. The organization and content of the book cater to senior undergraduates, graduate students, researchers, practitioners, professionals and academicians in the aforementioned disciplines. It can also be used as a reference book and includes numerous references and open problems.
Argyros joined the CU faculty in 1990. His research interests include applied mathematics, operator theory, computational mathematics and iterative methods especially on Banach spaces. Argyros has published more than a thousand peer-reviewed papers, 32 books and 17 chapters in books about computational mathematics. He is the recipient of the 2001 Distinguished Research Award from the Southwest Oklahoma Advanced Technology Association. He is a member of the editorial board for the American Journal of Computational Mathematics.
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PR#23-113