org.hipparchus.ode.nonstiff

Class AdamsBashforthIntegrator

java.lang.Object

org.hipparchus.ode.AbstractIntegrator

org.hipparchus.ode.nonstiff.AdaptiveStepsizeIntegrator

org.hipparchus.ode.MultistepIntegrator

org.hipparchus.ode.nonstiff.AdamsIntegrator

org.hipparchus.ode.nonstiff.AdamsBashforthIntegrator

All Implemented Interfaces:

ODEIntegrator

public class AdamsBashforthIntegrator
extends AdamsIntegrator

This class implements explicit Adams-Bashforth integrators for Ordinary Differential Equations.

Adams-Bashforth methods (in fact due to Adams alone) are explicit multistep ODE solvers. This implementation is a variation of the classical one: it uses adaptive stepsize to implement error control, whereas classical implementations are fixed step size. The value of state vector at step n+1 is a simple combination of the value at step n and of the derivatives at steps n, n-1, n-2 ... Depending on the number k of previous steps one wants to use for computing the next value, different formulas are available:

• k = 1: y_n+1 = y_n + h y'_n
• k = 2: y_n+1 = y_n + h (3y'_n-y'_n-1)/2
• k = 3: y_n+1 = y_n + h (23y'_n-16y'_n-1+5y'_n-2)/12
• k = 4: y_n+1 = y_n + h (55y'_n-59y'_n-1+37y'_n-2-9y'_n-3)/24
• ...

A k-steps Adams-Bashforth method is of order k.

There must be sufficient time for the starter integrator to take several steps between the the last reset event, and the end of integration, otherwise an exception may be thrown during integration. The user can adjust the end date of integration, or the step size of the starter integrator to ensure a sufficient number of steps can be completed before the end of integration.

Implementation details

We define scaled derivatives s_i(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
 

The definitions above use the classical representation with several previous first derivatives. Lets define

   qn = [ s1(n-1) s1(n-2) ... s1(n-(k-1)) ]T
 

(we omit the k index in the notation for clarity). With these definitions, Adams-Bashforth methods can be written:

• k = 1: y_n+1 = y_n + s₁(n)
• k = 2: y_n+1 = y_n + 3/2 s₁(n) + [ -1/2 ] q_n
• k = 3: y_n+1 = y_n + 23/12 s₁(n) + [ -16/12 5/12 ] q_n
• k = 4: y_n+1 = y_n + 55/24 s₁(n) + [ -59/24 37/24 -9/24 ] q_n
• ...

Instead of using the classical representation with first derivatives only (y_n, s₁(n) and q_n), our implementation uses the Nordsieck vector with higher degrees scaled derivatives all taken at the same step (y_n, s₁(n) and r_n) where r_n is defined as:

 rn = [ s2(n), s3(n) ... sk(n) ]T
 

(here again we omit the k index in the notation for clarity)

Taylor series formulas show that for any index offset i, s₁(n-i) can be computed from s₁(n), s₂(n) ... s_k(n), the formula being exact for degree k polynomials.

 s1(n-i) = s1(n) + ∑j>0 (j+1) (-i)j sj+1(n)
 

The previous formula can be used with several values for i to compute the transform between classical representation and Nordsieck vector. The transform between r_n and q_n resulting from the Taylor series formulas above is:

 qn = s1(n) u + P rn
 

where u is the [ 1 1 ... 1 ]^T vector and P is the (k-1)×(k-1) matrix built with the (j+1) (-i)^j terms with i being the row number starting from 1 and j being the column number starting from 1:

        [  -2   3   -4    5  ... ]
        [  -4  12  -32   80  ... ]
   P =  [  -6  27 -108  405  ... ]
        [  -8  48 -256 1280  ... ]
        [          ...           ]
 

Using the Nordsieck vector has several advantages:

• it greatly simplifies step interpolation as the interpolator mainly applies Taylor series formulas,
• it simplifies step changes that occur when discrete events that truncate the step are triggered,
• it allows to extend the methods in order to support adaptive stepsize.

The Nordsieck vector at step n+1 is computed from the Nordsieck vector at step n as follows:

• y_n+1 = y_n + s₁(n) + u^T r_n
• s₁(n+1) = h f(t_n+1, y_n+1)
• r_n+1 = (s₁(n) - s₁(n+1)) P^-1 u + P^-1 A P r_n

where A is a rows shifting matrix (the lower left part is an identity matrix):

        [ 0 0   ...  0 0 | 0 ]
        [ ---------------+---]
        [ 1 0   ...  0 0 | 0 ]
    A = [ 0 1   ...  0 0 | 0 ]
        [       ...      | 0 ]
        [ 0 0   ...  1 0 | 0 ]
        [ 0 0   ...  0 1 | 0 ]
 

The P^-1u vector and the P^-1 A P matrix do not depend on the state, they only depend on k and therefore are precomputed once for all.

Field Summary

Fields inherited from class org.hipparchus.ode.MultistepIntegrator

nordsieck, scaled

Fields inherited from class org.hipparchus.ode.nonstiff.AdaptiveStepsizeIntegrator

mainSetDimension, scalAbsoluteTolerance, scalRelativeTolerance, vecAbsoluteTolerance, vecRelativeTolerance

Constructor Summary

Constructors

Constructor and Description
AdamsBashforthIntegrator(int nSteps, double minStep, double maxStep, double[] vecAbsoluteTolerance, double[] vecRelativeTolerance) Build an Adams-Bashforth integrator with the given order and step control parameters.
AdamsBashforthIntegrator(int nSteps, double minStep, double maxStep, double scalAbsoluteTolerance, double scalRelativeTolerance) Build an Adams-Bashforth integrator with the given order and step control parameters.

Method Summary

Modifier and Type	Method and Description
ODEStateAndDerivative	integrate(ExpandableODE equations, ODEState initialState, double finalTime) Integrate the differential equations up to the given time.

Methods inherited from class org.hipparchus.ode.nonstiff.AdamsIntegrator

initializeHighOrderDerivatives, updateHighOrderDerivativesPhase1, updateHighOrderDerivativesPhase2

Methods inherited from class org.hipparchus.ode.MultistepIntegrator

computeStepGrowShrinkFactor, getMaxGrowth, getMinReduction, getNSteps, getSafety, getStarterIntegrator, rescale, setMaxGrowth, setMinReduction, setSafety, setStarterIntegrator, start

Methods inherited from class org.hipparchus.ode.nonstiff.AdaptiveStepsizeIntegrator

filterStep, getMaxStep, getMinStep, initializeStep, resetInternalState, sanityChecks, setInitialStepSize, setStepSizeControl, setStepSizeControl

Methods inherited from class org.hipparchus.ode.AbstractIntegrator

acceptStep, addEventHandler, addEventHandler, addStepHandler, clearEventHandlers, clearStepHandlers, computeDerivatives, getCurrentSignedStepsize, getCurrentStepStart, getEquations, getEvaluations, getEvaluationsCounter, getEventHandlers, getMaxEvaluations, getName, getStepHandlers, getStepSize, getStepStart, initIntegration, isLastStep, resetOccurred, setIsLastStep, setMaxEvaluations, setStateInitialized, setStepSize, setStepStart

Methods inherited from class java.lang.Object

clone, equals, finalize, getClass, hashCode, notify, notifyAll, toString, wait, wait, wait

Methods inherited from interface org.hipparchus.ode.ODEIntegrator

integrate, integrate

Constructor Detail

AdamsBashforthIntegrator

public AdamsBashforthIntegrator(int nSteps,
                                double minStep,
                                double maxStep,
                                double scalAbsoluteTolerance,
                                double scalRelativeTolerance)
                         throws MathIllegalArgumentException

Build an Adams-Bashforth integrator with the given order and step control parameters.

Parameters:

nSteps - number of steps of the method excluding the one being computed

minStep - minimal step (sign is irrelevant, regardless of integration direction, forward or backward), the last step can be smaller than this

maxStep - maximal step (sign is irrelevant, regardless of integration direction, forward or backward), the last step can be smaller than this

scalAbsoluteTolerance - allowed absolute error

scalRelativeTolerance - allowed relative error

Throws:

MathIllegalArgumentException - if order is 1 or less

AdamsBashforthIntegrator

public AdamsBashforthIntegrator(int nSteps,
                                double minStep,
                                double maxStep,
                                double[] vecAbsoluteTolerance,
                                double[] vecRelativeTolerance)
                         throws IllegalArgumentException

Build an Adams-Bashforth integrator with the given order and step control parameters.

Parameters:

nSteps - number of steps of the method excluding the one being computed

minStep - minimal step (sign is irrelevant, regardless of integration direction, forward or backward), the last step can be smaller than this

maxStep - maximal step (sign is irrelevant, regardless of integration direction, forward or backward), the last step can be smaller than this

vecAbsoluteTolerance - allowed absolute error

vecRelativeTolerance - allowed relative error

Throws:

IllegalArgumentException - if order is 1 or less

Method Detail

integrate

public ODEStateAndDerivative integrate(ExpandableODE equations,
                                       ODEState initialState,
                                       double finalTime)
                                throws MathIllegalArgumentException,
                                       MathIllegalStateException

Integrate the differential equations up to the given time.

This method solves an Initial Value Problem (IVP).

Since this method stores some internal state variables made available in its public interface during integration (ODEIntegrator.getCurrentSignedStepsize()), it is not thread-safe.

Specified by:

integrate in interface ODEIntegrator

Specified by:

integrate in class AdamsIntegrator

Parameters:

equations - differential equations to integrate

initialState - initial state (time, primary and secondary state vectors)

finalTime - target time for the integration (can be set to a value smaller than t0 for backward integration)

Returns:

final state, its time will be the same as finalTime if integration reached its target, but may be different if some ODEEventHandler stops it at some point.

Throws:

MathIllegalArgumentException - if integration step is too small

MathIllegalStateException - if the number of functions evaluations is exceeded