deBif: Bifurcation Analysis of Ordinary Differential Equation Systems
Shiny application that performs bifurcation and phaseplane analysis of systems of ordinary
differential equations. The package allows for computation of equilibrium curves as a function of
a single free parameter, detection of transcritical, saddle-node and hopf bifurcation points along
these curves, and computation of curves representing these transcritical, saddle-node and hopf
bifurcation points as a function of two free parameters. The shiny-based GUI allows visualization
of the results in both 2D- and 3D-plots. The implemented methods for solution localisation and curve
continuation are based on the book "Elements of applied bifurcation theory" (Kuznetsov, Y. A., 1995;
ISBN: 0-387-94418-4).
Version: |
0.1.5 |
Depends: |
R (≥ 4.0) |
Imports: |
graphics, deSolve (≥ 1.3), rootSolve (≥ 1.8), rstudioapi (≥
0.13), shiny (≥ 1.7), shinyjs (≥ 2.0), shinydashboard (≥
0.7), shinydashboardPlus (≥ 2.0) |
Suggests: |
knitr, R.rsp, rmarkdown |
Published: |
2022-04-08 |
Author: |
Andre M. de Roos [aut, cre] |
Maintainer: |
Andre M. de Roos <A.M.deRoos at uva.nl> |
License: |
GPL-3 |
NeedsCompilation: |
yes |
Materials: |
NEWS |
CRAN checks: |
deBif results |
Documentation:
Downloads:
Linking:
Please use the canonical form
https://CRAN.R-project.org/package=deBif
to link to this page.