Author: Bai, Genming
Title: Stable and convergent numerical methods for geometric and physical PDEs
Degree: Ph.D.
Year: 2023
Subject: Differential equations, Partial -- Numerical solutions
Geometry, Differential
Mathematical physics
Hong Kong Polytechnic University -- Dissertations
Department: Department of Applied Mathematics
Pages: x, 302 pages : color illustrations
Language: English
Abstract: The first part (Chapter 2 and 3) of this thesis discusses the stability issues arising from approximating geometric flows (mean curvature flow, Willmore flow, etc.) using finite element method of parametric type. This topic is rather important because the lack of numerical stability is the main obstacle in the way of getting convergence proofs.
The contributions of this part (Chapter 2 and 3) are the first ever convergence proof with a L2-suboptimal error estimate for Dziuk’s method for mean curvature flow of closed surfaces (open problem since 1990) and the first ever convergence proof with a L2-optimal error estimate for a stabilized BGN method for mean curvature flow of closed curves (open problem since 2008). Dziuk’s and BGN method are the two most important algorithms in the field of numerical geometric flows. Alongside giving the first ever convergence proofs to these two methods, we also develop a new framework of analysing the general behaviours of the finite element approximation to geometric flows. This framework is expected to be a new powerful tool which would help to design and analyse robust and convergent algorithms where our design and analysis of a stabilized version of the BGN method in Chapter 3 is the first example of this kind. The methodologies and treatments developed in Chapter 2 and 3 are hopeful to become standard in the future.
The second part (Chapter 4–8) is a collection of miscellaneous topics with focus on the design of robust algorithms, stability analysis and convergence proof of the numerical methods for various linear and nonlinear PDEs arsing in geometry and physics.
Rights: All rights reserved
Access: open access

Files in This Item:
File Description SizeFormat 
7206.pdfFor All Users10.68 MBAdobe PDFView/Open


Copyright Undertaking

As a bona fide Library user, I declare that:

  1. I will abide by the rules and legal ordinances governing copyright regarding the use of the Database.
  2. I will use the Database for the purpose of my research or private study only and not for circulation or further reproduction or any other purpose.
  3. I agree to indemnify and hold the University harmless from and against any loss, damage, cost, liability or expenses arising from copyright infringement or unauthorized usage.

By downloading any item(s) listed above, you acknowledge that you have read and understood the copyright undertaking as stated above, and agree to be bound by all of its terms.

Show full item record

Please use this identifier to cite or link to this item: https://theses.lib.polyu.edu.hk/handle/200/12756