Ordinary Differential Equations (ODE)

See also

The examples related to ODE resolution.

An ODEProblem represents a first order ordinary differential equation (ODE) with a given state at an initial time. This ODEProblem is built with a function of time and state, as well as an array describing the initial state, and a time interval.

An ODEResult represents the solution of an ODE evaluated at a discrete set of times within the specified time interval.

Note

This feature is under active development. Future iterations include the integration of ODEProblem s with Discipline.

Architecture

ODEProblem and ODEResult

The main classes in the ODE submodule are the ODEProblem and ODEResult. These represent respectively the first-order ODE with its initial conditions, and the solution of this problem evaluated at a discrete set of values for time.

As a reminder, a first-order ordinary differential equation is an equation of the form:

\[\frac{ds}{dt}(t) = f(t, s(t)) \ \textrm{ and }\ s(t_0) = s_0\]

where \(s\) is the state which depends on \(t\), the time. The right-hand side function \(f\) is a function of the time and the state. The value of the state at an initial time \(t_0\) is known to be \(s_0\).

The solution of this problem is provided for discrete values of time within a given interval \([t_0,\ t_f]\).

Correspondence between the elements of an ordinary differential equation with initial conditions and the attributes of the ODEProblem and ODEResult classes.

Classes

The classes described by the ODE module are as such:

Packages

The submodules are organized in the following fashion.