NAG AD Library
d02pr (ivp_rkts_reset_tend)

Settings help

AD Name Style:

AD Specification Language:

1 Purpose

d02pr is the AD Library version of the primal routine d02prf. Based (in the C++ interface) on overload resolution, d02pr can be used for primal, tangent and adjoint evaluation. It supports tangents and adjoints of first and second order.

2 Specification

Fortran Interface
Subroutine d02pr_AD_f ( ad_handle, tendnu, iwsav, rwsav, ifail)
Integer, Intent (Inout) :: iwsav(130), ifail
ADTYPE, Intent (In) :: tendnu
ADTYPE, Intent (Inout) :: rwsav(350)
Type (c_ptr), Intent (Inout) :: ad_handle
Corresponding to the overloaded C++ function, the Fortran interface provides five routines with names reflecting the type used for active real arguments. The actual subroutine and type names are formed by replacing AD and ADTYPE in the above as follows:
when ADTYPE is Real(kind=nag_wp) then AD is p0w
when ADTYPE is Type(nagad_a1w_w_rtype) then AD is a1w
when ADTYPE is Type(nagad_t1w_w_rtype) then AD is t1w
when ADTYPE is Type(nagad_a1t1w_w_rtype) then AD is a1t1w
when ADTYPE is Type(nagad_t2w_w_rtype) then AD is t2w
C++ Interface
#include <dco.hpp>
#include <nagad.h>
namespace nag {
namespace ad {
void d02pr ( handle_t &ad_handle, const ADTYPE &tendnu, Integer iwsav[], ADTYPE rwsav[], Integer &ifail)
The function is overloaded on ADTYPE which represents the type of active arguments. ADTYPE may be any of the following types:
Note: this function can be used with AD tools other than dco/c++. For details, please contact NAG.

3 Description

d02pr is the AD Library version of the primal routine d02prf.
d02prf resets the end point in an integration performed by d02pff or d02pgf. For further information see Section 3 in the documentation for d02prf.

4 References

Brankin R W, Gladwell I and Shampine L F (1991) RKSUITE: A suite of Runge–Kutta codes for the initial value problems for ODEs SoftReport 91-S1 Southern Methodist University

5 Arguments

In addition to the arguments present in the interface of the primal routine, d02pr includes some arguments specific to AD.
A brief summary of the AD specific arguments is given below. For the remainder, links are provided to the corresponding argument from the primal routine. A tooltip popup for all arguments can be found by hovering over the argument name in Section 2 and in this section.
1: ad_handlenag::ad::handle_t Input/Output
On entry: a configuration object that holds information on the differentiation strategy. Details on setting the AD strategy are described in AD handle object in the NAG AD Library Introduction.
2: tendnuADTYPE Input
3: iwsav(130) – Integer array Communication Array
4: rwsav(350) – ADTYPE array Communication Array
Please consult Overwriting of Inputs in the NAG AD Library Introduction.
5: ifail – Integer Input/Output

6 Error Indicators and Warnings

d02pr preserves all error codes from d02prf and in addition can return:
An unexpected AD error has been triggered by this routine. Please contact NAG.
See Error Handling in the NAG AD Library Introduction for further information.
The routine was called using a strategy that has not yet been implemented.
See AD Strategies in the NAG AD Library Introduction for further information.
A C++ exception was thrown.
The error message will show the details of the C++ exception text.
Dynamic memory allocation failed for AD.
See Error Handling in the NAG AD Library Introduction for further information.

7 Accuracy

Not applicable.

8 Parallelism and Performance

d02pr is not threaded in any implementation.

9 Further Comments


10 Example

The following examples are variants of the example for d02prf, modified to demonstrate calling the NAG AD Library.
Description of the primal example.
This example integrates a two body problem. The equations for the coordinates (x(t),y(t)) of one body as functions of time t in a suitable frame of reference are
y=-yr3,   r=x2+y2.  
The initial conditions
x(0)=1-ε, x(0)=0 y(0)=0, y(0)= 1+ε 1-ε  
lead to elliptic motion with 0<ε<1. ε=0.7 is selected and the system of ODEs is reposed as
y1=y3 y2=y4 y3=- y1r3 y4=- y2r3  
over the range [0,6π]. Relative error control is used with threshold values of 1.0E−10 for each solution component and compute the solution at intervals of length π across the range using d02pr to reset the end of the integration range. A high-order Runge–Kutta method (method=−3) is also used with tolerances tol=1.0E−4 and tol=1.0E−5 in turn so that the solutions may be compared.

10.1 Adjoint modes

Language Source File Data Results
Fortran d02pr_a1t1w_fe.f90 d02pr_a1t1w_fe.d d02pr_a1t1w_fe.r
Fortran d02pr_a1w_fe.f90 d02pr_a1w_fe.d d02pr_a1w_fe.r
C++ d02pr_a1_algo_dcoe.cpp None d02pr_a1_algo_dcoe.r
C++ d02pr_a1t1_algo_dcoe.cpp None d02pr_a1t1_algo_dcoe.r

10.2 Tangent modes

Language Source File Data Results
Fortran d02pr_t1w_fe.f90 d02pr_t1w_fe.d d02pr_t1w_fe.r
Fortran d02pr_t2w_fe.f90 d02pr_t2w_fe.d d02pr_t2w_fe.r
C++ d02pr_t1_algo_dcoe.cpp None d02pr_t1_algo_dcoe.r
C++ d02pr_t2_algo_dcoe.cpp None d02pr_t2_algo_dcoe.r

10.3 Passive mode

Language Source File Data Results
Fortran d02pr_p0w_fe.f90 d02pr_p0w_fe.d d02pr_p0w_fe.r
C++ d02pr_passive_dcoe.cpp None d02pr_passive_dcoe.r