本の詳細
形式
ペーパーバック
ページ数
407
言語
英語
公開されました
Nov 28, 2011
出版社
Cambridge University Press
版
1
ISBN-10
1107621542
ISBN-13
9781107621541
説明
Dmitry E. Pelinovsky offers a thorough exploration of the intricate dynamics governed by the Gross-Pitaevskii equation within the realm of periodic potentials. By drawing connections between quantum mechanics and mathematical physics, the work delves into the multifaceted behaviors and properties of solutions to this pivotal equation, which plays a crucial role in the study of Bose-Einstein condensates and similar phenomena.
Throughout its pages, the author articulates the relevance of Schrödinger operators as a foundational element in understanding these complex systems. The narrative extends beyond theoretical constructs, showcasing practical implications and applications in contemporary physics. The text elucidates localization effects that arise in periodic potentials, showcasing the interplay between mathematical rigor and physical intuition.
As he navigates through the intricacies of both linear and nonlinear dynamics, Pelinovsky provides readers with insightful results and methodologies that enhance comprehension. The fusion of mathematical analysis with physical models creates a cohesive understanding of the material, making this work a valuable resource for both researchers and students interested in mathematical physics and its applications in modern science.
Throughout its pages, the author articulates the relevance of Schrödinger operators as a foundational element in understanding these complex systems. The narrative extends beyond theoretical constructs, showcasing practical implications and applications in contemporary physics. The text elucidates localization effects that arise in periodic potentials, showcasing the interplay between mathematical rigor and physical intuition.
As he navigates through the intricacies of both linear and nonlinear dynamics, Pelinovsky provides readers with insightful results and methodologies that enhance comprehension. The fusion of mathematical analysis with physical models creates a cohesive understanding of the material, making this work a valuable resource for both researchers and students interested in mathematical physics and its applications in modern science.