Book Details
Format
Hardcover
Pages
400
Language
English
Published
Mar 11, 2016
Publisher
Cambridge University Press
Edition
1
ISBN-10
1107111943
ISBN-13
9781107111943
Description
This work delves into the intricate world of nonlocal fractional problems, presenting an extensive exploration of variational methods. The authors, renowned experts in the field, navigate through the complexities of fractional Sobolev spaces, laying a solid foundation for understanding nonlocal phenomena. By meticulously discussing the fractional framework, they illuminate the mathematical structures pivotal for addressing such challenges.
In the first section, the authors introduce critical concepts, including density results that are essential for comprehending the nuances of fractional Sobolev spaces. This groundwork prepares readers to tackle more complicated scenarios where traditional local methods fall short. Through a combination of theory and practical illustrations, they emphasize how nonlocal settings possess unique characteristics that necessitate specialized approaches.
Each chapter is crafted with clarity, aiming to bridge the gap between abstract theory and practical application. The authors challenge the reader to think critically about established norms in mathematics, encouraging a deeper understanding of how nonlocal phenomena operate across various disciplines.
With its detailed yet accessible presentation, the work serves as an invaluable resource for mathematicians and researchers seeking to expand their understanding of variational methods in the context of nonlocal fractional problems. The authors' passion for the subject is evident, making this an engaging read even for those new to the field.
In the first section, the authors introduce critical concepts, including density results that are essential for comprehending the nuances of fractional Sobolev spaces. This groundwork prepares readers to tackle more complicated scenarios where traditional local methods fall short. Through a combination of theory and practical illustrations, they emphasize how nonlocal settings possess unique characteristics that necessitate specialized approaches.
Each chapter is crafted with clarity, aiming to bridge the gap between abstract theory and practical application. The authors challenge the reader to think critically about established norms in mathematics, encouraging a deeper understanding of how nonlocal phenomena operate across various disciplines.
With its detailed yet accessible presentation, the work serves as an invaluable resource for mathematicians and researchers seeking to expand their understanding of variational methods in the context of nonlocal fractional problems. The authors' passion for the subject is evident, making this an engaging read even for those new to the field.
Genres
Science & Technology