"The book covers a variety of mathematical topics that deal with the foundational aspects for application in engineering and applied sciences. It focuses on both the pure and applied aspects to allow for the development of rich theory for use in engineering and applied sciences. The book is written for individual researchers, educators, students, and department libraries"--
The book explores a range of mathematical topics essential for application in engineering and applied sciences. It explores both the theoretical and practical aspects, providing a comprehensive foundation for the development of robust theories applicable to engineering and applied sciences.
The book explores a range of mathematical topics essential for application in engineering and applied sciences. It explores both the theoretical and practical aspects, providing a comprehensive foundation for the development of robust theories applicable to engineering and applied sciences.
Mathematical Analysis for Engineering and Applied Sciences: Foundational and Fundamental Aspects discusses the essential mathematical principles that underpin the fields of applied science and engineering. This comprehensive book explores a blend of pure and applied mathematics, demonstrating how mathematical tools and techniques can be utilized to create a wide range of models for practical applications in these disciplines. It addresses the challenges of handling complex phenomena and provides algorithms, methods, and logical concepts that are invaluable for bioengineering, cryptosystems, surface modeling, and various other engineering applications.
Individual researchers, educators, students, and department libraries will find this book of interest.
1. Pure Mathematics Applied to Bio-Engineering Problems.
2. Inverse
Coefficient Problem for Nonlinear Euler-Bernoulli Equation with Periodic
Boundary and Integral Addition Conditions.
3. A Classification of Focal
Surfaces of a Tube Surface in E3.
4. Approximation of Functions in Certain
Lipschitz Classes by (M, n)(E, 1) Means of Fourier Series and Conjugate
Series of Fourier Series.
5. NTRU Cryptosystem Over Rational Numbers Q_p and
a New Verification Method over Rational Functions Field.
6. Metric Spaces and
Fixed-Point Results in G-Metric Spaces.
7. Inertial Three-Step
Forward-Backward Splitting Algorithms to Solve Inclusion Problems and Their
Application to Image Restoration Problems.
8. Explicit Study of Fractal
Generation of Mandelbrot and Julia Sets via Picard-S Iteration Scheme with
S-Convexity.
Hemen Dutta has been a faculty member at Gauhati University, India, since 2010 and presently holds the position of associate professor. Before joining Gauhati University, he served three other academic institutions in different capacities. He is currently interested in applied analysis and mathematical modeling. Dr. Dutta has published over 180 publications as research papers, book chapters and proceedings papers. He has also published several authored and edited books.
Ahmet Ocak Akdemir is a professor in the Department of Mathematics at Ar Ibrahim Ēeēen University, Ar, Turkey. His research interests focus mainly on inequality theory, convex analysis, and real functions of two variables, especially fractional calculus, and integral operators. He has published several research papers with pioneer journals and has delivered several talks at international conferences and meetings. Dr. Akdemir has organized several international conferences as chairman and member of the organizing committee. He is the recipient of numerous publication encouragement awards given by his university as well as private institutions.
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