% Step 1: Estimate a set of control variable histories, u(t)
amplitude = 4;
tf = 100;
totalLength = 200;
W = 10;
epsilon = .5;
iterations = 100;
z = amplitude * rand(tf * 10 + 1, 1) - amplitude / 2;
z3 = 0;
i3 = 0;
finalSize = totalLength * 10 + 1;
iTemp = zeros(iterations, 1);
iTemp2 = zeros(iterations, 1);
dist = zeros(iterations, 1);
ap = zeros(iterations, 1);
lengthStorage = zeros(finalSize, iterations);
zt = linspace(0, tf, tf * 10 + 1);
zt2 = linspace(0, totalLength, totalLength * 10 + 1);
zt3 = linspace(0, totalLength, finalSize);
for counter = 1:iterations
z2 = zeros(totalLength * 10 + 1, 1);
z2(1:tf * 10 + 1) = z;
% Step 2: Integrate system equations forward with specified
% initial conditions x(t0) and control variable histories.
% Record x, u, psi(x(tf))
[Tx, X] = ode113(@(t, y) hh(t, y, zt2, z2), [0 totalLength], [0.0026 0.0529 0.3177 0.596]);
if (sum(isnan(X)) ~= 0)
'broken'
break;
end
Xf = interp1(Tx, X, tf);
psi = Xf(1) - 15;
lengthStorage(:, counter) = interp1(zt2, z2, zt3);
figure (1);
subplot(2, 4, 1); plot(zt2, -z2); xlabel('Time'); ylabel('Stimulus Current');
subplot(2, 4, 2); plot(iTemp); xlabel('Iteration'); ylabel('L2-Norm');
subplot(2, 4, 3); plot(dist); xlabel('Iteration'); ylabel('Error in Terminal Condition');
subplot(2, 4, 5); plot(Tx, X(:, 1)); hold on; plot(tf, Xf(:, 1), 'r.'); hold off; xlabel('Time'); ylabel('Vm');
subplot(2, 4, 6); plot(Tx, X(:, 2)); hold on; plot(tf, Xf(:, 2), 'r.'); hold off; xlabel('Time'); ylabel('m');
subplot(2, 4, 7); plot(Tx, X(:, 3)); hold on; plot(tf, Xf(:, 3), 'r.'); hold off; xlabel('Time'); ylabel('n');
subplot(2, 4, 8); plot(Tx, X(:, 4)); hold on; plot(tf, Xf(:, 4), 'r.'); hold off; xlabel('Time'); ylabel('h');
% Step 3: Determine n-vector p(t), and matrix R(t) by backward integration
% of the influence equations using x(tf) obtained in step 2 to determine
% boundary conditions
[Tp, p] = ode113(@(t, y) pInfluence(t, y, Tx, X), [tf 0], [0 0 0 0]);
[TR, R] = ode113(@(t, y) RInfluence(t, y, Tx, X), [tf 0], [1 0 0 1]);
% consolidating all the time stamps
t1 = union(TR, zt);
t = union(Tp, t1);
iz = interp1(zt, z, t);
ip = interp1(Tp, p, t);
iR = interp1(TR, R, t);
% Step 4: Compute Ipp, Ijp, Ijj integrals
Ipp = (1 / W) * trapz(t, iR(:, 1) .^ 2);
Ijp = (1 / W) * trapz(t, (-ip(:, 1) + 2 * iz) .* (-iR(:, 1)));
Ijj = (1 / W) * trapz(t, (-ip(:, 1) + 2 * iz) .* (-ip(:, 1) + 2 * iz));
% Step 5: Choose values of dPsi, then determine v
dPsi = -epsilon * psi;
v = -inv(Ipp) * (dPsi + Ijp');
% Step 6: Decide whether to continue
iTemp(counter) = Ijj - Ijp / Ipp * Ijp';
iTemp2(counter) = trapz(zt2, z2 .^ 2);
dist(counter) = abs(psi(1));
% Step 6: Improve estimate of z(t)
dZ = -(1 / W) * (2 * iz - ip(:, 1) - iR(:, 1) * v);
z = iz + dZ;
% zt = t;
zt = linspace(0, tf, tf * 10 + 1);
za = interp1(t, z, zt);
z = za;
% [counter iTemp(counter) * 1000 dist(counter)]
end
index = dist < 5;
if (sum(index) > 0)
[~, i] = min(iTemp(index));
z3 = lengthStorage(:, i);
end