Autonomous ODE

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Autonomous ODE's have no explicit t-dependence. They come in the form

Equilibrium Solutions

Autonomous ODE's have trivial ODE solutions.

If

then

is an equilibrium solution of the ODE.

If is a solution, then so is for any constant

General Solution

Autonomous equations can be solved by Separation of Variables method.

Equilibrium Analysis

Consider

  • If , the solution is at equilibrium
  • If , then y is increasing in t
  • If , then y is decreasing in t

This can be visualized on a phase line.

Some equilibrium solutions are stable, where the solutions converge and slight perturbations in y will not result in drastic changes in the solution. In contrast, some other equilibrium solutions are unstable, where slight perturbation will result in drastic changes.