Abstract
We describe a simple method for tracking solutions of nonlinear equations f (u, α)[1]0 through turning points (also known as limit or saddle-node bifurcation points). Our implementation makes use of symbolic software such as Mathematica to derive an exact system of nonlinear ODE equations to follow the solution path, using a parameterization closely related to arc length.We illustrate our method with examples taken from the engineering literature, including examples that involve nonlinear boundary value problems that have been discretized by finite difference methods. Since the code requirement to implement the method is modest, we believe the method is ideal for demonstrating continuation methods in the classroom.
| Original language | English |
|---|---|
| Pages (from-to) | 1035-1042 |
| Number of pages | 8 |
| Journal | Journal of Chemical Engineering of Japan |
| Volume | 43 |
| Issue number | 12 |
| DOIs | |
| State | Published - 2010 |
Keywords
- Continuation methods
- Nonlinear equations
- Turning points
ASJC Scopus subject areas
- General Chemistry
- General Chemical Engineering