Abstract Fractional Monotone Approximation, Theory and Applications
Published on 12. March 2022
Book
Hardback
XII, 145 pages
978-3-030-95942-5 (ISBN)
Description
This book employs an abstract kernel fractional calculus with applications to Prabhakar and non-singular kernel fractional calculi. The results are univariate and bivariate. In the univariate case, abstract fractional monotone approximation by polynomials and splines is presented. In the bivariate case, the abstract fractional monotone constrained approximation by bivariate pseudo-polynomials and polynomials is given. This book's results are expected to find applications in many areas of pure and applied mathematics, especially in fractional approximation and fractional differential equations. Other interesting applications are applied in sciences like geophysics, physics, chemistry, economics, and engineering. This book is appropriate for researchers, graduate students, practitioners, and seminars of the above disciplines.
Reviews / Votes
"The book is a very interesting contribution to the recent developments in fractional calculus, which is widely studied due to its numerous applications in many scientific fields." (Carlo Bardaro, Mathematical Reviews, September, 2023)More details
Series
Edition
2022 ed.
Language
English
Place of publication
Cham
Switzerland
Publishing group
Springer International Publishing
Target group
Professional and scholarly
Illustrations
XII, 145 p.
Dimensions
Height: 241 mm
Width: 160 mm
Thickness: 15 mm
Weight
412 gr
ISBN-13
978-3-030-95942-5 (9783030959425)
DOI
10.1007/978-3-030-95943-2
Schweitzer Classification
Other editions
Additional editions
George A. Anastassiou
Abstract Fractional Monotone Approximation, Theory and Applications
Book
03/2023
Springer
€149.79
Shipment within 7-9 days
George A. Anastassiou
Abstract Fractional Monotone Approximation, Theory and Applications
E-Book
03/2022
1st Edition
Springer
€139.09
Available for download
Content
Basic abstract fractional monotone approximation.- Abstract bivariate left fractional monotone constrained approximation by pseudo-polynomials.- Conclusion.