Package org.hipparchus.ode

Class MultistepFieldIntegrator<T extends RealFieldElement<T>>

  • Type Parameters:
    T - the type of the field elements
    All Implemented Interfaces:
    FieldODEIntegrator<T>
    Direct Known Subclasses:
    AdamsFieldIntegrator
    public abstract class MultistepFieldIntegrator<T extends RealFieldElement<T>>
extends AdaptiveStepsizeFieldIntegrator<T>
    This class is the base class for multistep integrators for Ordinary Differential Equations.

    We define scaled derivatives si(n) at step n as: 

     s1(n) = h y'n for first derivative
 s2(n) = h2/2 y''n for second derivative
 s3(n) = h3/6 y'''n for third derivative
 ...
 sk(n) = hk/k! y(k)n for kth derivative

    Rather than storing several previous steps separately, this implementation uses the Nordsieck vector with higher degrees scaled derivatives all taken at the same step (yn, s1(n) and rn) where rn is defined as: 

     rn = [ s2(n), s3(n) ... sk(n) ]T
    (we omit the k index in the notation for clarity)

    Multistep integrators with Nordsieck representation are highly sensitive to large step changes because when the step is multiplied by factor a, the kth component of the Nordsieck vector is multiplied by ak and the last components are the least accurate ones. The default max growth factor is therefore set to a quite low value: 21/order.

    See Also:
    AdamsBashforthFieldIntegrator, AdamsMoultonFieldIntegrator

    • Constructor Detail

      • MultistepFieldIntegrator

        protected MultistepFieldIntegrator​(Field<T> field,
                                   String name,
                                   int nSteps,
                                   int order,
                                   double minStep,
                                   double maxStep,
                                   double scalAbsoluteTolerance,
                                   double scalRelativeTolerance)
                            throws MathIllegalArgumentException
        Build a multistep integrator with the given stepsize bounds.

        The default starter integrator is set to the Dormand-Prince 8(5,3) integrator with some defaults settings.

        The default max growth factor is set to a quite low value: 21/order.

        Parameters:
        field - field to which the time and state vector elements belong
        name - name of the method
        nSteps - number of steps of the multistep method (excluding the one being computed)
        order - order of the method
        minStep - minimal step (must be positive even for backward integration), the last step can be smaller than this
        maxStep - maximal step (must be positive even for backward integration)
        scalAbsoluteTolerance - allowed absolute error
        scalRelativeTolerance - allowed relative error
        Throws:
        MathIllegalArgumentException - if number of steps is smaller than 2

      • MultistepFieldIntegrator

        protected MultistepFieldIntegrator​(Field<T> field,
                                   String name,
                                   int nSteps,
                                   int order,
                                   double minStep,
                                   double maxStep,
                                   double[] vecAbsoluteTolerance,
                                   double[] vecRelativeTolerance)
        Build a multistep integrator with the given stepsize bounds.

        The default starter integrator is set to the Dormand-Prince 8(5,3) integrator with some defaults settings.

        The default max growth factor is set to a quite low value: 21/order.

        Parameters:
        field - field to which the time and state vector elements belong
        name - name of the method
        nSteps - number of steps of the multistep method (excluding the one being computed)
        order - order of the method
        minStep - minimal step (must be positive even for backward integration), the last step can be smaller than this
        maxStep - maximal step (must be positive even for backward integration)
        vecAbsoluteTolerance - allowed absolute error
        vecRelativeTolerance - allowed relative error

    • Method Detail

      • getStarterIntegrator

        public FieldODEIntegrator<T> getStarterIntegrator()
        Get the starter integrator.
        Returns:
        starter integrator

      • setStarterIntegrator

        public void setStarterIntegrator​(FieldODEIntegrator<T> starterIntegrator)
        Set the starter integrator.

        The various step and event handlers for this starter integrator will be managed automatically by the multi-step integrator. Any user configuration for these elements will be cleared before use.

        Parameters:
        starterIntegrator - starter integrator

      • start

        protected void start​(FieldExpandableODE<T> equations,
                     FieldODEState<T> initialState,
                     T t)
              throws MathIllegalArgumentException,
                     MathIllegalStateException
        Start the integration.

        This method computes one step using the underlying starter integrator, and initializes the Nordsieck vector at step start. The starter integrator purpose is only to establish initial conditions, it does not really change time by itself. The top level multistep integrator remains in charge of handling time propagation and events handling as it will starts its own computation right from the beginning. In a sense, the starter integrator can be seen as a dummy one and so it will never trigger any user event nor call any user step handler.

        Parameters:
        equations - complete set of differential equations to integrate
        initialState - initial state (time, primary and secondary state vectors)
        t - target time for the integration (can be set to a value smaller than t0 for backward integration)
        Throws:
        MathIllegalArgumentException - if arrays dimension do not match equations settings
        MathIllegalArgumentException - if integration step is too small
        MathIllegalStateException - if the number of functions evaluations is exceeded
        MathIllegalArgumentException - if the location of an event cannot be bracketed

      • initializeHighOrderDerivatives

        protected abstract Array2DRowFieldMatrix<T> initializeHighOrderDerivatives​(T h,
                                                                           T[] t,
                                                                           T[][] y,
                                                                           T[][] yDot)
        Initialize the high order scaled derivatives at step start.
        Parameters:
        h - step size to use for scaling
        t - first steps times
        y - first steps states
        yDot - first steps derivatives
        Returns:
        Nordieck vector at first step (h2/2 y''n, h3/6 y'''n ... hk/k! y(k)n)

      • getMinReduction

        public double getMinReduction()
        Get the minimal reduction factor for stepsize control.
        Returns:
        minimal reduction factor

      • setMinReduction

        public void setMinReduction​(double minReduction)
        Set the minimal reduction factor for stepsize control.
        Parameters:
        minReduction - minimal reduction factor

      • getMaxGrowth

        public double getMaxGrowth()
        Get the maximal growth factor for stepsize control.
        Returns:
        maximal growth factor

      • setMaxGrowth

        public void setMaxGrowth​(double maxGrowth)
        Set the maximal growth factor for stepsize control.
        Parameters:
        maxGrowth - maximal growth factor

      • getSafety

        public double getSafety()
        Get the safety factor for stepsize control.
        Returns:
        safety factor

      • setSafety

        public void setSafety​(double safety)
        Set the safety factor for stepsize control.
        Parameters:
        safety - safety factor

      • getNSteps

        public int getNSteps()
        Get the number of steps of the multistep method (excluding the one being computed).
        Returns:
        number of steps of the multistep method (excluding the one being computed)

      • rescale

        protected void rescale​(T newStepSize)
        Rescale the instance.

        Since the scaled and Nordsieck arrays are shared with the caller, this method has the side effect of rescaling this arrays in the caller too.

        Parameters:
        newStepSize - new step size to use in the scaled and Nordsieck arrays

      • computeStepGrowShrinkFactor

        protected T computeStepGrowShrinkFactor​(T error)
        Compute step grow/shrink factor according to normalized error.
        Parameters:
        error - normalized error of the current step
        Returns:
        grow/shrink factor for next step