Package | Description |
---|---|
org.hipparchus.ode |
This package provides classes to solve Ordinary Differential Equations problems.
|
org.hipparchus.ode.nonstiff |
This package provides classes to solve non-stiff Ordinary Differential Equations problems.
|
Class and Description |
---|
AdaptiveStepsizeFieldIntegrator
This abstract class holds the common part of all adaptive
stepsize integrators for Ordinary Differential Equations.
|
AdaptiveStepsizeIntegrator
This abstract class holds the common part of all adaptive
stepsize integrators for Ordinary Differential Equations.
|
Class and Description |
---|
AdamsFieldIntegrator
Base class for
Adams-Bashforth and
Adams-Moulton integrators. |
AdamsIntegrator
Base class for
Adams-Bashforth and
Adams-Moulton integrators. |
AdamsNordsieckFieldTransformer
Transformer to Nordsieck vectors for Adams integrators.
|
AdamsNordsieckTransformer
Transformer to Nordsieck vectors for Adams integrators.
|
AdaptiveStepsizeFieldIntegrator
This abstract class holds the common part of all adaptive
stepsize integrators for Ordinary Differential Equations.
|
AdaptiveStepsizeIntegrator
This abstract class holds the common part of all adaptive
stepsize integrators for Ordinary Differential Equations.
|
ButcherArrayProvider
This interface represents an integrator based on Butcher arrays.
|
EmbeddedRungeKuttaFieldIntegrator
This class implements the common part of all embedded Runge-Kutta
integrators for Ordinary Differential Equations.
|
EmbeddedRungeKuttaIntegrator
This class implements the common part of all embedded Runge-Kutta
integrators for Ordinary Differential Equations.
|
FieldButcherArrayProvider
This interface represents an integrator based on Butcher arrays.
|
RungeKuttaFieldIntegrator
This class implements the common part of all fixed step Runge-Kutta
integrators for Ordinary Differential Equations.
|
RungeKuttaIntegrator
This class implements the common part of all fixed step Runge-Kutta
integrators for Ordinary Differential Equations.
|
Copyright © 2016–2020 Hipparchus.org. All rights reserved.