PROPT Simple Bang Bang Problem: Difference between revisions

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<math> J = \int_{-\frac{1}{2}}^{\frac{1}{2}} t*u \mathrm{d}t </math>
<math> J = \int_{-\frac{1}{2}}^{\frac{1}{2}} t*u \mathrm{d}t </math>


subject to:
subject to:


<math> |u| <= 1 </math>
<math> |u| <= 1 </math>


<source lang="matlab">
<source lang="matlab">

Revision as of 08:12, 9 November 2011

Notice.png

This page is part of the PROPT Manual. See PROPT Manual.

Function Space Complementarity Methods for Optimal Control Problems, Dissertation, Martin Weiser

Problem Description

Find u over t in [-0.5; 0.5 ] to minimize:


subject to:


% Copyright (c) 2007-2008 by Tomlab Optimization Inc.

Problem setup

toms t
p = tomPhase('p', t, -0.5, 1, 20);
setPhase(p);
tomStates x
tomControls u

% Initial guess
x0 = {collocate(u == 1-2*(t+0.5))
    icollocate(x == 1-2*(t+0.5))};

% Box constraints
cbox = {-1 <= icollocate(x) <= 1
    -1 <= collocate(u)  <= 1};

% ODEs and path constraints
ceq = collocate(dot(x) == 0);

% Objective
objective = integrate(t.*u);

Solve the problem

options = struct;
options.name = 'Simple Bang Bang Problem';
solution = ezsolve(objective, {cbox, ceq}, x0, options);
t = subs(collocate(t),solution);
u = subs(collocate(u),solution);
Problem type appears to be: lp
Time for symbolic processing: 0.013436 seconds
Starting numeric solver
===== * * * =================================================================== * * *
TOMLAB - TOMLAB Development license  999007. Valid to 2011-12-31
=====================================================================================
Problem: ---  1: Simple Bang Bang Problem       f_k      -0.250490325030180820
                                       sum(|constr|)      0.000000000000870996
                              f(x_k) + sum(|constr|)     -0.250490325029309850
                                              f(x_0)      0.000000000000000000

Solver: CPLEX.  EXIT=0.  INFORM=1.
CPLEX Dual Simplex LP solver
Optimal solution found


Elapsed time: 0.002000 sec. 

Plot result

figure(1);
plot(t,u,'*-');
legend('u');
ylim([-1.1,1.1]);

SimpleBangBang 01.png