Addendum to the paper "Two-Dimensional Infinite Prandtl Number Convection: Structure of Bifurcated Solutions, J. Nonlinear Sci., 17(3), 199-220, 2007"
Tian Ma, Jungho Park, Shouhong Wang
TL;DR
This addendum discusses bifurcation theories for nonlinear PDEs and their relevance to fluid dynamics, providing remarks and literature references without presenting new experimental or theoretical results.
Contribution
It offers insights and references on bifurcation theories in nonlinear PDEs applied to fluid dynamics, complementing the original research paper.
Findings
Highlights importance of bifurcation theory in fluid dynamics
Provides literature references on nonlinear PDE bifurcations
Comments on applications without new empirical data
Abstract
The main objective of this addendum to the mentioned article by Park is to provide some remarks on bifurcation theories for nonlinear partial differential equations (PDE) and their applications to fluid dynamics problems. We only wish to comment and list some related literatures, without any intention to provide a complete survey.
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Taxonomy
TopicsStability and Controllability of Differential Equations · Navier-Stokes equation solutions · Advanced Mathematical Modeling in Engineering