NAG Library Manual, Mark 28.5
Interfaces:  FL   CL   CPP   AD 

NAG AD Library Introduction
Example description
/* nag::ad::f07ca Adjoint Example Program.
 */

#include <dco.hpp>
#include <iostream>
#include <nagad.h>

// Function which calls NAG AD Library routines.
template <typename T>
void func(std::vector<T> &l,
          std::vector<T> &d,
          std::vector<T> &u,
          std::vector<T> &x);

// Driver with the adjoint calls.
// Computes the solution to a system of linear equations Ax=b where A is a
// triagonal matrix of size n. Matrix A is stored in arrays l(n-1), d(n), u(n-1)
// that store the lower, the main and the upper diagonals. Also, computes the
// sum of the Jacobian elements of output x w.r.t. all inputs l, d, u, b.
void driver(const std::vector<double> &lv,
            const std::vector<double> &dv,
            const std::vector<double> &uv,
            const std::vector<double> &bv,
            std::vector<double> &      xv,
            double &                   dxdall);

int main()
{
  std::cout << " nag::ad::f07ca Adjoint Example Program Results\n";

  // Problem dimension
  Integer n = 5;
  // Matrix A stored in diagonals
  std::vector<double> lv = {3.4, 3.6, 7.0, -6.0};
  std::vector<double> dv = {3.0, 2.3, -5.0, -0.9, 7.1};
  std::vector<double> uv = {2.1, -1.0, 1.9, 8.0};
  // Right-hand-side vector b
  std::vector<double> bv = {2.7, -0.5, 2.6, 0.6, 2.7};
  // Computed solution to the system Ax=b
  std::vector<double> xv(n);

  double dxdall;
  // Call driver
  driver(lv, dv, uv, bv, xv, dxdall);

  std::cout << "\n Solution point = ";
  for (int i = 0; i < n; i++)
  {
    std::cout.width(5);
    std::cout << xv[i];
  }
  std::cout << std::endl;

  std::cout.setf(std::ios::scientific, std::ios::floatfield);
  std::cout.precision(12);
  std::cout << "\n Derivatives calculated: First order adjoints\n";
  std::cout << " Computational mode    : symbolic\n\n";

  std::cout
      << "\n Sum of all Jacobian elements of solution x w.r.t. l,d,u and b:\n";
  std::cout << " sum_ij [dx/dall]_ij = " << dxdall << std::endl;

  return 0;
}

// Driver with the adjoint calls.
// Computes the solution to a system of linear equations Ax=b where A is a
// triagonal matrix of size n. Matrix A is stored in arrays l(n-1), d(n), u(n-1)
// that store the lower, the main and the upper diagonals. Also, computes the
// sum of the Jacobian elements of output x w.r.t. all inputs l, d, u, b.
void driver(const std::vector<double> &lv,
            const std::vector<double> &dv,
            const std::vector<double> &uv,
            const std::vector<double> &bv,
            std::vector<double> &      xv,
            double &                   dxdall)
{
  using T = dco::ga1s<double>::type;
  // Create AD tape
  dco::ga1s<double>::global_tape = dco::ga1s<double>::tape_t::create();

  Integer n  = xv.size();
  Integer n1 = n - 1;
  // Stores the lower diagonal of A
  std::vector<T> l(n1), l1(n1);
  dco::value(l) = lv;
  dco::ga1s<double>::global_tape->register_variable(l);
  l1 = l;
  // Stores the main diagonal of A
  std::vector<T> d(n), d1(n);
  dco::value(d) = dv;
  dco::ga1s<double>::global_tape->register_variable(d);
  d1 = d;
  // Stores the upper diagonal of A
  std::vector<T> u(n1), u1(n1);
  dco::value(u) = uv;
  dco::ga1s<double>::global_tape->register_variable(u);
  u1 = u;
  // Stores right-hand-side vector b, variable to differentiate w.r.t.
  std::vector<T> b(n);
  dco::value(b) = bv;
  dco::ga1s<double>::global_tape->register_variable(b);

  // Variable to differentiate
  std::vector<T> x(n);

  // nag::ad::f07ca modifies rhs b and returns solution into the same array.
  // Since we seek dx/db, and b is overwritten, we must save these input nodes
  // in the DAG.  Hence we save b and overwrite a copy of it.
  x = b;
  // Call the NAG AD Lib functions
  func(l1, d1, u1, x);

  // Solution point
  xv = dco::value(x);

  dco::ga1s<double>::global_tape->register_output_variable(x);
  dco::derivative(x) = std::vector<double>(n, 1.0);
  dco::ga1s<double>::global_tape->interpret_adjoint();

  dxdall = 0;
  // Get sum of Jacobian elements of solution x w.r.t. d and b
  for (int i = 0; i < n; i++)
  {
    dxdall += dco::derivative(d[i]);
    dxdall += dco::derivative(b[i]);
  }
  // Get sum of Jacobian elements of solution x w.r.t. l and u
  for (int i = 0; i < n1; i++)
  {
    dxdall += dco::derivative(l[i]);
    dxdall += dco::derivative(u[i]);
  }

  // Remove tape
  dco::ga1s<double>::tape_t::remove(dco::ga1s<double>::global_tape);
}

// Function which calls NAG AD Library routines.
template <typename T>
void func(std::vector<T> &l,
          std::vector<T> &d,
          std::vector<T> &u,
          std::vector<T> &x)
{
  Integer n = x.size(), nrhs = 1;

  // Create AD configuration data object
  Integer           ifail = 0;
  nag::ad::handle_t ad_handle;

  // Set computational mode
  ad_handle.set_strategy(nag::ad::symbolic);
  // Solve the equations Ax = b for x
  ifail = 0;
  nag::ad::f07ca(ad_handle, n, nrhs, l.data(), d.data(), u.data(), x.data(), n,
                 ifail);

  ifail = 0;
}