Overview
This dissertation, Periodic Steady-state Analysis of Nonlinear Oscillators Based on Multivariate Polynomial Roots Finding by Shuqi, Zhang, 张书奇, was obtained from The University of Hong Kong (Pokfulam, Hong Kong) and is being sold pursuant to Creative Commons: Attribution 3.0 Hong Kong License. The content of this dissertation has not been altered in any way. We have altered the formatting in order to facilitate the ease of printing and reading of the dissertation. All rights not granted by the above license are retained by the author. Abstract: Periodic steady-state analysis plays an important role in both theoretical topics and numerical simulations. It has been applied to numerous fields such as electronics, economics, biology, chemistry and so on. Particularly in electronics it is the basis of microwave and radio frequency (RF) circuit simulation. Although the topic has been studied for decades, periodic steady-state analysis still remains a difficulty in certain aspects including the analysis of the exact analytical formulas of limit cycles, as well as fast and accurate approximation of periodic steady states with unknown frequencies. In this thesis, two innovative methods are proposed in order to overcome two difficulties in the field of periodic steady-state analysis accordingly: on the one hand, a limit cycle identification method is developed to provide a robust method for computation of the exact analytical formulas of limit cycles. The method can be further extended to a wide range of nonlinear systems by the technique called state immersion. On the other hand, a method for highly accurate periodic steady-state approximation based on harmonic balancing is proposed. It combines the robustness of Macaulay matrix approach for small size polynomial root(s) finding, and the efficiency of a guided global optimization for higher order approximations. Thus, it is capable of computing approximations of periodic steady states with a high accuracy. Together, the two methods establish a reliable framework where highly accurate periodic steady-state analysis for a wide range of nonlinear systems can be performed. DOI: 10.5353/th_b5351049 Subjects: Nonlinear oscillators
Full Product Details
Author: Shuqi Zhang ,
张书奇
Publisher: Open Dissertation Press
Imprint: Open Dissertation Press
Dimensions:
Width: 21.60cm
, Height: 0.40cm
, Length: 27.90cm
Weight: 0.218kg
ISBN: 9781361366165
ISBN 10: 1361366168
Publication Date: 27 January 2017
Audience:
General/trade
,
General
Format: Paperback
Publisher's Status: Active
Availability: Temporarily unavailable
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