159 lines
4.8 KiB
Matlab
159 lines
4.8 KiB
Matlab
function [u, ut, uc, U_corr_history] = control_act(t, q, sim_data)
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dc = decouple_matrix(q, sim_data.b);
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ut = utrack(t, q, sim_data);
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[uc, U_corr_history] = ucorr(t, q, sim_data);
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ut = dc*ut;
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uc = dc*uc;
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u = ut+uc;
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% saturation
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u = min(sim_data.SATURATION, max(-sim_data.SATURATION, u));
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end
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function [u_corr, U_corr_history] = ucorr(t, q, sim_data)
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pred_hor = sim_data.PREDICTION_HORIZON;
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SATURATION = sim_data.SATURATION;
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PREDICTION_SATURATION_TOLERANCE = sim_data.PREDICTION_SATURATION_TOLERANCE;
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tc = sim_data.tc;
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u_corr = zeros(2,1);
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U_corr_history = zeros(2,1,sim_data.PREDICTION_HORIZON);
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if eq(pred_hor, 0)
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return
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end
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if pred_hor > 1
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% move the horizon over 1 step and add trailing zeroes
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U_corr_history = cat(3, sim_data.U_corr_history(:,:, 2:end), zeros(2,1));
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end
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%disp('start of simulation')
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q_act = q;
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q_pred=zeros(3,1, pred_hor);
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u_track_pred=zeros(2,1, pred_hor);
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T_inv_pred=zeros(2,2, pred_hor);
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% for each step in the prediction horizon, integrate the system to
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% predict its future state
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for k = 1:pred_hor
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% start from the old (known) state
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% compute the inputs, based on the old state
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% u_corr is the prediction done at some time in the past, as found in U_corr_history
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u_corr_ = U_corr_history(:, :, k);
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% u_track can be computed from q
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t_ = t + tc * (k-1);
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u_track_ = utrack(t_, q_act, sim_data);
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T_inv = decouple_matrix(q_act, sim_data.b);
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u_ = T_inv * (u_corr_ + u_track_);
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theta_new = q_act(3) + tc*u_(2);
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% compute the state integrating with euler
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%x_new = q_act(1) + tc*u_(1) * cos(q_act(3));
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%y_new = q_act(2) + tc*u_(1) * sin(q_act(3));
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% compute the state integrating via runge-kutta
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x_new = q_act(1) + tc*u_(1) * cos(q_act(3) + 0.5*tc*u_(2));
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y_new = q_act(2) + tc*u_(1) * sin(q_act(3) + 0.5*tc*u_(2));
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q_new = [x_new; y_new; theta_new];
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% save history
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%q_pred(:,:,k) = q_new;
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u_track_pred(:,:,k) = u_track_;
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T_inv_pred(:,:,k) = T_inv;
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% Prepare old state for next iteration
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q_act = q_new;
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end
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%{
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Now setup the qp problem
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It needs:
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- Unknowns, u_corr at each timestep. Will be encoded as a vector of
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vectors, in which every two elements is a u_j
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i.e. (u_1; u_2; u_3; ...; u_C) = (v_1; w_1; v_2, w_2; v_3, w_3; ...
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; v_C, w_C)
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It is essential that the vector stays a column, so that u'u is the
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sum of the squared norms of each u_j
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- Box constraints: a constraint for each timestep in the horizon.
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Calculated using the predicted state and inputs. They need to be
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put in matrix (Ax <= b) form
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%}
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% box constrains
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% A becomes sort of block-diagonal
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% A will be at most PREDICTION_HORIZON * 2 * 2 (2: size of T_inv; 2:
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% accounting for T_inv and -T_inv) by PREDICTION_HORIZON (number of
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% vectors in u_corr times the number of elements [2] in each vector)
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A_max_elems = pred_hor * 2 * 2;
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A_deq = [];
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b_deq = [];
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s_ = SATURATION - ones(2,1)*PREDICTION_SATURATION_TOLERANCE;
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for k=1:pred_hor
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T_inv = T_inv_pred(:,:,k);
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u_track = u_track_pred(:,:,k);
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% [T_inv; -T_inv] is a 4x2 matrix
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n_zeros_before = (k-1) * 4;
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n_zeros_after = A_max_elems - n_zeros_before - 4;
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zeros_before = zeros(n_zeros_before, 2);
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zeros_after = zeros(n_zeros_after, 2);
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column = [zeros_before; T_inv; -T_inv; zeros_after];
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A_deq = [A_deq, column];
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d = T_inv*u_track;
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b_deq = [b_deq; s_ - d; s_ + d];
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end
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%A_deq
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%b_deq
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% unknowns
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% squared norm of u_corr. H must be identity,
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% PREDICTION_HORIZON*size(u_corr)
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H = eye(pred_hor*2)*2;
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% no linear terms
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f = zeros(pred_hor*2, 1);
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% solve qp problem
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options = optimoptions('quadprog', 'Display', 'off');
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U_corr = quadprog(H, f, A_deq, b_deq, [],[],[],[],[],options);
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% reshape the vector of vectors to be an array, each element being
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% u_corr_j as a 2x1 vector
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% and add the prediction at t_k+C
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U_corr_history = reshape(U_corr, [2,1,pred_hor]);
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%sim_data.U_corr_history = U_corr_history;
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% first result is what to do now
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u_corr=U_corr_history(:,:, 1);
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end
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function u_track = utrack(t, q, sim_data)
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ref_s = double(subs(sim_data.ref, t));
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dref_s = double(subs(sim_data.dref, t));
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f = feedback(q, sim_data.b);
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err = ref_s - f;
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u_track = dref_s + sim_data.K*err;
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end
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function q_track = feedback(q, b)
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q_track = [q(1) + b*cos(q(3)); q(2) + b*sin(q(3)) ];
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end
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function T_inv = decouple_matrix(q, b)
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theta = q(3);
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st = sin(theta);
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ct = cos(theta);
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T_inv = [ct, st; -st/b, ct/b];
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end
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