Abdelkrim Salim, Ph.D.

Professor (Associate) and Researcher in Mathematics

Advanced Topics on Semilinear Evolution Equations


Book


M. Benchohra, G. M N'Guérékata, A. Salim
Series on Concrete and Applicable Mathematics: Volume 25, World Scientific, World Scientific, Hackensack, NJ, 2025


Cite

Cite

APA   Click to copy
Benchohra, M., N'Guérékata, G. M., & Salim, A. (2025). Advanced Topics on Semilinear Evolution Equations. (W. Scientific, Ed.). Hackensack, NJ: World Scientific. https://doi.org/10.1142/14092


Chicago/Turabian   Click to copy
Benchohra, M., G. M N'Guérékata, and A. Salim. Advanced Topics on Semilinear Evolution Equations. Edited by World Scientific. Series on Concrete and Applicable Mathematics: Volume 25. Hackensack, NJ: World Scientific, 2025.


MLA   Click to copy
Benchohra, M., et al. Advanced Topics on Semilinear Evolution Equations. Edited by World Scientific, World Scientific, 2025, doi:10.1142/14092.


BibTeX   Click to copy

@book{m2025a,
  title = {Advanced Topics on Semilinear Evolution Equations},
  year = {2025},
  address = {Hackensack, NJ},
  publisher = {World Scientific},
  series = {Series on Concrete and Applicable Mathematics: Volume 25},
  doi = {10.1142/14092},
  author = {Benchohra, M. and N'Guérékata, G. M and Salim, A.},
  editor = {Scientific, World}
}

Differential evolution equations serve as mathematical representations that capture the progression or transformation of functions or systems as time passes. Currently, differential equations continue to be an active and thriving area of study, with continuous advancements in mathematical methodologies and their practical applications spanning diverse fields such as physics, engineering, and economics. In the late 20th century, the notion of "Differential Evolution Equations" emerged as a distinct field applied to optimization and machine learning challenges. Evolution equations hold immense importance in numerous realms of applied mathematics and have experienced notable prominence in recent times.
This book delves into the study of several classes of equations, aiming to investigate the existence of mild and periodic mild solutions and their properties such as approximate controllability, complete controllability and attractivity, under various conditions. By examining diverse problems involving second-order semilinear evolution equations, differential and integro-differential equations with state-dependent delay, random effects, and functional differential equations with delay and random effects, we hope to contribute to the advancement of mathematical knowledge and provide researchers, academicians, and students with a solid foundation for further exploration in this field. Throughout this book, we explore different mathematical frameworks, employing Fréchet spaces and Banach spaces to provide a comprehensive analysis. Our investigation extends beyond traditional solutions, encompassing the study of asymptotically almost automorphic mild solutions, periodic mild solutions, and impulsive integro-differential equations. These topics shed light on the behavior of equations in both bounded and unbounded domains, offering valuable insights into the dynamics of functional evolution equations. 

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