授業
Advanced Automation 2023†
latest lecture
[lecture #1] 2023.9.7 outline of the lecture, review of classical and modern control theory (1/3)†
- review : stabilization of SISO unstable plant by classical and modern control theory
- transfer functions / differential equations
- poles / eigenvalues
- impulse response / initial value response
- ...
%-- 2023/09/07 13:21 --%
s = tf('s')
P = 1/(s-1)
pole(P)
impulse(P)
pole(P)
K = 2
help step
Tyr = K/(s-1+K)
step(Tyr)
[lecture #2] 2023.9.14 review of classical and modern control theory (2/3) with introduction of Matlab/Simulink†
- introduction of Matlab and Simulink
text_fixed.pdf Basic usage of MATLAB and Simulink used for 情報処理演習及び考究II/Consideration and Practice of Information Processing II: Advanced Course of MATLAB
- interactive system (no compilation, no variable definition)
- m file
- system representation: Transfer Function(TF) / State-Space Representation (SSR)
- example: mass-spring-damper system
- definition of SSR
- from SSR to TF
- from TF to SSR: controllable canonical form
- open-loop characteristic
- open-loop stability: poles and eigenvalues
- Bode plot and frequency response ex0914_1.m mod0914_1.mdl
- cut off frequency; DC gain; -40dB/dec; variation of c
- relation between P(jw) and steady-state response
- closed-loop stability
- Nyquist stability criterion (for L(s):stable)
- Nyquist plot ex0914_2.m mod0914_2.mdl
- Gain Margin(GM); Phase Margin(PM)
%-- 2023/09/14 13:06 --%
a = 1
u=[1;2;3]
ex0914_1.m
ex0914_1
sqrt(k/m)
sqrt(k/m)/(2*pi)
[lecture #3] 2023.9.21 review of classical and modern control theory (3/3)†
- LQR problem
- controllability
- cost function J >= 0
- positive (semi-)definite matrices
- solution of LQR problem
- example ex0921_1.m mod0921_1.mdl
- ARE and quadratic equation
%-- 2023/09/21 13:42 --%
ex0921_1
A
eig(A)
Uc
B
A*B
ex0921_1
help are
P
eig(P)
G
F
F = [0, 0]
J
ex0921_1
F
J
J(end)
Jmin
[lecture #4] 2023.9.28 relation between LQR and H infinity control problem (1/2)†
- GOAL: to learn difference in concepts between LQR problem and H infinity control problem
- a simple example relating LQR and H infinity control problems
- For given plant G
\[
G = \left[\begin{array}{c|c:c} a & 1 & b \\ \hline \sqrt{q} & 0 & 0 \\ 0 & 0 & \sqrt{r} \\ \hdashline 1 & 0 & 0 \end{array} \right]
= \left\{ \begin{array}{l} \dot x = ax + bu + w\\ z = \left[ \begin{array}{c} \sqrt{q} x \\ \sqrt{r} u \end{array}\right] \\ x = x \end{array}\right.
\]
with zero initial state value x(0) = 0,
find a state-feedback controller
\[ u = -f x \]
such that
\begin{eqnarray}
(i) &&\quad \mbox{closed loop is stable} \\
(ii) &&\quad \mbox{minimize}
\left\{\begin{array}{l} \| z \|_2 \mbox{ for } w(t) = \delta(t) \quad \mbox{(LQR)} \\
\| T_{zw} \|_\infty \mbox{($H_\infty$ control problem)}\end{array}\right.
\end{eqnarray}
- comparison of norms in (ii) (for a = -1, b = 1, q = 1, r = 1)
\[
\begin{array}{|c||c|c|}\hline
& \mbox{LQR}: f=-1+\sqrt{2} & \quad \quad H_\infty: f=1\quad\quad \\ \hline\hline
J=\|z\|_2^2 & & \\ \hline
\|T_{zw}\|_\infty & & \\ \hline
\end{array}
\]
- an alternative description to LQR problem
- J = (L2 norm of z)^2
- impulse resp. with zero initial value = initial value resp. with zero disturbance
- definition of H infinity norm (SISO)
s = tf('s');
G1 = 1/(s+1);
bode(G1);
norm(G1, 'inf')
G2 = 1/(s^2 + 0.1*s + 1);
bode(G2);
norm(G2, 'inf')
- definition of H infinity norm (SIMO)
- solve the problem by hand
- solve the problem by tool(hinfsyn)
ex0928_1.m
%-- 2023/09/28 13:41 --%
s = tf('s');
G1 = 1/(s+1);
bode(G1);
norm(G1, 'inf')
format e
format long e
norm(G1, 'inf')
G3 = s/(s+1);
bode(G3);
norm(G3, 'inf')
G2 = 1/(s^2 + 0.1*s + 1);
bode(G2);
norm(G2, 'inf')
grid
ctrlpref
bode(G2);
grid
[lecture #5] 2023.10.05 relation between LQR and H infinity control problem (2/2)†
- cont.
- solve the problem by hand
- solve the problem by tool(hinfsyn) ex0928_1.m
- complete the table in simple example
- confirm the cost function J for both controllers by simulation mod1005.mdl
- block diagram in the simulink model
- how to approximate impulse disturbance with a step function
- (unit) impulse disturbance resp. with zero initial condition = (unit) initial condition resp. with zero disturbance
- confirm the closed-loop H infinity norm for both controllers by simulation
- H infinity norm = L2 induced norm
- review: steady-state response for sinusoidal input signal; how to choose the frequency such that the output amplitude is maximized ?
- the worst-case disturbance w(t) for the simple example ?
- general state-feedback case: hinf.pdf
- includes the simple example as a special case
- LQR lqr.pdf is included as a special case in which gamma -> infinity, w(t) = 0, B2 -> B, and non-zero x(0) are considered
%-- 2023/10/05 13:06 --%
ex0928_1
K
help sigma
clp0
norm(clp, 'inf')
norm(clp0, 'inf')
sqrt(2-sqrt(2))
mod1005
f = -1+sqrt(2)
h = 0.01
x0 = 0
plot(t, x)
zz
zz(end)
x0
x0 = 1
zz
f
f = 1
zz
x0 = 0
zz
h
x0
h = 100
f
zz
sqrt(zz(end)/ww(end))
f = -1+sqrt(2)
sqrt(zz(end)/ww(end))
[lecture #6] 2023.10.12 Mixed sensitivity problem 1/3†
- outline: map_v1.1_mixedsens1.pdf
- sensitivity function S and complementary sensitivity function T
- H infinity control problem (general case)
- with generalized plant G
- including the state-feedback case
- reference tracking problem
- how to translate the condition (ii) into one with H infinity norm ?
- corresponding generalized plant G ?
- introduction of weighting function for sensitivity function in (ii)
- design example ex1012_1.m ex1012_2.m
- the small gain theorem
- proof: Nyquist stability criterion
%-- 2023/10/12 13:43 --%
ex1012_1
P
eig(P)
ctrlpref
ex1012_1
ex1012_2
K_hinf
eig(K_hinf)
[lecture #7] 2023.10.19 Mixed sensitivity problem 2/3†
- outline: from point to set map_v1.1_mixedsens2.pdf
- the small gain theorem ... robust stability = H infinity norm condition
- normalized uncertainty Delta
- uncertainty model
- simple example of plant set
- given plant P tilde
- frequency response of plant with perturbation ex1019_1.m
- how to determine P0 and WT ?
- frequency response based procedure for P0 and WT ex1019_2.m
- robust stabilization problem and equivalent problem
%-- 2023/10/19 13:26 --%
ex1019_1
ex1019_3
ex1019_2
ex1019_3
mod1019
c
c = 0.8
c = 2
c = 1.5
[lecture #8] 2023.10.26 Mixed sensitivity problem 3/3†
- review: map_v1.1_mixedsens2.pdf (1)performance optimization and (2)robust stabilization
- outline:
- how to design controllers considering both conditions in (1) and (2)
- gap between NP(nominal performance) and RP(robust performance)
- mixed sensitivity problem => (1) and (2) : proof
- generalized plant for mixed senstivity problem
- design example ex1026_1.m minimize gamma by hand
- gamma iteration by bisection method ex1026_2.m tradeoff between model robust stability and performance
- intro. to RP: weak point of mixed sensitivity problem(problem of NP) ex1026_3.m
%-- 2023/10/26 13:36 --%
pwd
ex1026_1
K
ex1026_1
ex1026_2
gam
ex1026_2
gam
ex1026_2
gam
ex1026_2
gam
ex1026_3
ex1026_2
ex1026_3
[lecture #9] 2023.11.2 robust performance problem 1/3†
- review
- mixed sensitivity problem : N.P. but not R.P.
- robust performance problem (R.P.), but can not be solved by tool
- an equivalent robust stability (R.S.) problem to R.P.
- (i) introduction of a fictitious uncertainty Delta_p (for performance)
- (ii) for 2-by-2 uncertainty block Delta hat which includes Delta and Delta_p
- definition of H infinity norm for general case (MIMO)
- proof of ||Delta hat||_inf <= 1
- design example: ex1102_1.m
- robust performance is achieved but large gap
- non structured uncertainty is considered ... the design problem is too conservative
%-- 2023/11/02 13:54 --%
M = [1, 1; 1i/sqrt(2), -1i/sqrt(2)]
M'
eig(M'*M)
svd(M)
pwd
ex1102_1
[lecture #10] 2023.11.9 Robust performance problem (2/3)†
- return of mini report #1
- SVD: singular value decomposition
- definition
- meaning of the largest singular value (a property and proof)
- 2 norm of vectors (Euclidean norm)
- SVD for 2-by-2 real matrix ex1109_1.m
%-- 2023/11/09 13:26 --%
M = [1, 1; 1i/sqrt(2), -1i/sqrt(2)]
[U, S, V] = svd(M)
U'*U
format long e
U'*U
U*U'
V'*V
U*S*V'
U*S*V'- M
format short
U*S*V'- M
ex1109_1
rand(1,1)
rand(1,3)
[lecture #11] 2023.11.16 Robust performance problem (3/3)†
- review : R.S. problems for structured and unstructured uncertainty
- scaled H infinity control problem
- relation between three problems
- how to determine structure of scaling matrix
- design example ex1116_1.m
ex1102_1
gam2 = gam_opt
ex1116_1
gam_opt
- mini exam #1 (10 min.)
%-- 2023/11/16 13:03 --%
ex1102_1
gam_opt
format long
gam_opt
gam2 = gam_opt
ex1116_1
gam_opt
gam2
opts = hinfsynOptions
opts.AutoScale = 'off'
ex1116_1
[lecture #12] 2023.11.23 Robust performance problem (3/3) (cont.), Control system design for practical system (1/3)†
- return of mini exam #1
- review of scaling ex1123_1.m
- mini report #2 report2.pdf
- introduction of a practical system: Speed control of two inertia system with servo motors
- experimental setup
setup_fixed.pdf
photo.jpg
- objective of control system = reference speed tracking control problem: to drive the drive-side servomotor by generating proper driving signal u (T_M) using drive-side speed y (\omega_M) such that y tracks the reference speed command r
- frequency response experiment and physical model of speed control system
servo1.dat servo2.dat
- room 374 @ Dept. Mech. Bldg. 2
%-- 2023/11/23 13:09 --%
ex1123_1
format long
eig(clp2.a)
ex1123_2
[lecture #13] 2023.11.30 [CANCELLED]†
Due to a hardware problem in our experimental environment, today's lecture is cancelled. I'm sorry for the inconvenience.
Please check the modified schedule at schedule2023
!!! the remaining page is under construction (the contents below are from last year) !!!
[lecture #13] 2023.12.7 Control system design for practical system (2/3)†
- return of mini report #2; ... You will have a mini exam #2 related to this report next week
- review of the experimental system
- closed-loop system of 2-by-2 plant G and controller K
- closed-loop gain is desired to be minimized for constant speed operation
- frequency response data of G can be used; how to handle modeling error of G ?
- design example (modeling error for Gyu is only considered for simplicity)
- frequency response experiment data
servo1.dat
servo2.dat
- determination of plant model(nominal plant and multiplicative uncertainty weight)
nominal.m
weight.m
- configuration of generalized plant and controller design by scaled H infinity control problem using one-dimensional search on the scaling d
cont.m
- comparison of closed-loop gain characteristics with and without control
&ref(): File not found: "compare.m" at page "授業/制御工学特論2023";
- result of control experiment and evaluation
result.dat
perf.m
- final report and remote experimental system
- design your controller(s) so that the system performance is improved compared with the design example
- Draw the following figures and explain the difference between two control systems (your controller and the design example):
- bode diagram of controllers
- gain characteristic of closed-loop system from w to z
- time response of control experiment
- Why is the performance of your system improved(or unfortunately deteriorated)?
- due date: 4th(Thu) Jan 17:00
- submit your report(pdf file) by e-mail to kobayasi@nagaokaut.ac.jp
- You can use Japanese
- maximum controller order is 20
- submit your controller.dat, controller_order.dat, and controller.mat at this page:participant list2023(download is also possible) not later than 26th(Tue) Dec
- the system will be started until next lecture
- You can send up to 10 controllers
- control experimental results will be uploaded here
- freqresp ... frequency response will be measured and uploaded everyday
- how to improve the performance ?
- accuracy of the nominal(physical) model
- weighting for robust stability
- specifications of the experimental system
- program sources for frequency response experiment
- program sources for control experiment
- configuration of control experiment
- disturbance signal w is specified as described in hinf.h and hinf_module.c:
w = 0; // disturbance torque for driven motor
if((t > 2)&&(t < 3)){
w = RATED_TORQ * -0.15;
}
if((t > 4)&&(t < 5)){
w = RATED_TORQ * -0.1 * sin(2*M_PI*5.0 * (t-4.0));
}
da_conv(torq_volt_conv_1(w), 1);
- control signal u is limited as specified in hinf.h and hinf_module.c:
#define U_MAX (RATED_TORQ / 3.0)
if(u > U_MAX) u = U_MAX;
if(u < -U_MAX) u = -U_MAX;
u is generated by PI control for t < 1(s). Your designed controller is started at t = 1(s).
- calculation of rotational speed
%-- 2022/12/08 13:25 --%
nominal
pwd
cd ..
nominal
weight
cont
compare
perf
pwd
cd ..
perf
weight
#ref(): File not found: "2022.12.08-1.jpg" at page "授業/制御工学特論2023"
[lecture #14] 2022.12.16 Control system design for practical system (3/3)†
- web based remote experiment system
- usage; how to upload controller's
- powered by prof. Takebe, National Institute of Technology, Nagaoka College
- supplemental explanations
- room temperature is displayed and stored in temp.txt (Bosch Sensortec BME280 is used)
- c2d() is used to discretize the resultant continuous-time controller in cont.m
- You can send up to 10 controllers (don't fall into trial and error; think always about the reason)
- no strict control objective is given ( there is a freedom to define what is good performance; a frequency dependent weighting function can be introduced to evaluate the performance )
- preparation of your own controller(s) by using the remote experiment system
- mini exam #2
[lecture #15] 2022.12.22 Control system design for practical system (cont.)†
- return of mini exam #2
- schedule2022 no lecture will be given next week
- preparation of your own controller(s) by using the remote experiment system