Minimization of cost function on MPC
6 views (last 30 days)
Show older comments
Hello,
I want to optimize a cost function of MPC which is output reference tracking as shown below:
min J(∆u) = ||xref(k + i) − x(k + i)||2 Q+ ||∆u(k + i)||2 R + ||xref(k + N) − x(k + N)||2 S, where Q,R and S are weight matrices.
Can anyone tell me how can I optimize this with constraint -1<∆u<1. Is it better use solver or can I optimize it without using solver?
If using solver, how can I convert into standard solver form?
If without using solver, which function to be used to minimize this cost function?
Any help is appreciated. Thanks in advance
7 Comments
Sam Chak
on 6 Nov 2022
I think it depend on the problem and how you want to call quadprog() to perform the minimization and update the desired parameter in each iteration. If it is a MPC problem, then I prefer to use mpc() command:
mpcobj = mpc(plant, ts, P, M, W, MV, OV, DV)
Answers (1)
Sam Chak
on 7 Nov 2022
You have a system model sys and I presume that you have written your own code for the ODE_solver to run the sys.
Under normal circumstances, you should be able to specify the initial states y0 in the ODE_solver.
The solver should produce the numerical solution array y that corresponds to a value returned in time vector t.
With the data, you can run your own optim_solver to produce some control action u.
Then, update the initial states y0 with final value of the states y(end) from the last iteration.
Finally, repeat the loop/steps by running the ODE_solver > the optim_solver until the specified number of iteration is completed.
0 Comments
See Also
Categories
Find more on Refinement in Help Center and File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!