phaseR: Phase Plane Analysis of One- And Two-Dimensional Autonomous ODE
Systems
Performs a qualitative analysis of one- and two-dimensional
autonomous ordinary differential equation systems, using phase plane methods.
Programs are available to identify and classify equilibrium points, plot the
direction field, and plot trajectories for multiple initial conditions. In
the one-dimensional case, a program is also available to plot the phase
portrait. Whilst in the two-dimensional case, programs are additionally
available to plot nullclines and stable/unstable manifolds of saddle points.
Many example systems are provided for the user. For further details can be
found in Grayling (2014) <doi:10.32614/RJ-2014-023>.
Version: |
2.2.1 |
Imports: |
deSolve, graphics, grDevices, utils |
Suggests: |
knitr, rmarkdown, testthat |
Published: |
2022-09-02 |
DOI: |
10.32614/CRAN.package.phaseR |
Author: |
Michael J Grayling
[aut, cre],
Gerhard Burger
[ctb],
Tomas Capretto [ctb],
Stephen P Ellner [ctb],
John M Guckenheimer [ctb] |
Maintainer: |
Michael J Grayling <michael.grayling at newcastle.ac.uk> |
BugReports: |
https://github.com/mjg211/phaseR/issues |
License: |
MIT + file LICENSE |
URL: |
https://github.com/mjg211/phaseR |
NeedsCompilation: |
no |
Citation: |
phaseR citation info |
Materials: |
README NEWS |
In views: |
DifferentialEquations |
CRAN checks: |
phaseR results |
Documentation:
Downloads:
Reverse dependencies:
Linking:
Please use the canonical form
https://CRAN.R-project.org/package=phaseR
to link to this page.