- ホーム
- > 洋書
- > 英文書
- > Science / Mathematics
Full Description
This book presents a comprehensive investigation into the exponential and Mittag-Leffler Euler differences for semi-linear fractional-order differential equations, a subject falling within the purview of computational mathematics. The field of exponential and Mittag-Leffler Euler differences has witnessed a period of rapid development in recent times. This has led to the emergence of new techniques such as exponential Euler integrator, exponential Runge-Kutta methods, multistep exponential integrator, exponential Rosenbrock-type methods, and more. This book puts forth several difference approaches to fractional-order differential equations and offers insights into their practical applications in the study of neural networks. Adopting a holistic approach, the book presents a foundational framework for this topic, underscoring the significance of exponential and Mittag-Leffler Euler differences in the numerical theory of fractional-order differential equations.
The book is designed for graduate students with an interest in numerical solutions of fractional-order differential equations, as well as for researchers engaged in the qualitative theory of difference equations.
Contents
Preface.- Symbols and Acronyms.- Introduction.- The Theory of Delta MLEDs.- A Fuzzy MLED-CGNNs with Time Lags.- The Theory of Nabla MLEDs.- The Theory of CF-EEDs.- A Fuzzy EED-CF-BAMNNs with Time Lags.- Summaries and Perspectives.- References.- Index.
![ムンダ語の動詞:類型論的視座<br>The Munda Verb : Typological Perspectives (Trends in Linguistics. Studies and Monographs [TiLSM] 174) (2007. XVI, 306 S. 230 mm)](../images/goods/ar/work/imgdatak/31101/3110189658.jpg)
