Berry curvature in nonlinear systems

In this thesis, the critical phenomenon in Berry curvature of nonlinear systems that occurs at phase boundaries is described by using the Bogoliubov excitation of the semiquantal dynamics. Its is shown that when the critical boundary in the parameter space is crossed, the nonlinear geometric phase o...

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Bibliographic Details
Other Authors: Kam, Chon Fai (author.)
Format: Others
Language:English
Chinese
Published: 2014
Subjects:
Online Access:http://repository.lib.cuhk.edu.hk/en/item/cuhk-1291542
Description
Summary:In this thesis, the critical phenomenon in Berry curvature of nonlinear systems that occurs at phase boundaries is described by using the Bogoliubov excitation of the semiquantal dynamics. Its is shown that when the critical boundary in the parameter space is crossed, the nonlinear geometric phase of the Bogloubov excitations surrounding the elliptic fixed points experiences non-analytic behavior. === 在本論文,我們利用半古典動力學的博戈留波夫激發研究非線性系統的貝里曲率在相邊界上出現的臨界現象。結果顯示,當參數空間中的臨界曲面被越過,環繞橢圓不動點的博戈留波夫激發的非線性幾何相位發生非解析行為。 === Kam, Chon Fai = 非線性系統的貝里曲率 / 甘駿暉. === Thesis M.Phil. Chinese University of Hong Kong 2014. === Includes bibliographical references (leaves 49-56). === Abstracts also in Chinese. === Title from PDF title page (viewed on 18, October, 2016). === Kam, Chon Fai = Fei xian xing xi tong de Beili qu lu / Gan Junhui. === Detailed summary in vernacular field only.