How to convert symbolic transfer function to state space?

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Answer 1

Sam Chak on 29 Nov 2023

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I am uncertain about your intention regarding the symbolic state-space. The state-space object from the Control System Toolbox cannot be expressed symbolically. However, I can provide you with the conversion formula for the symbolic state-space in LaTeX form.

Plant transfer function:

Equivalent state-space system:

% Parameters
a   = 3;
b1  = 5;
b2  = 7;
% Plant transfer function
s   = tf('s');
Gp  = ((a + b2)*s^2 + 3*b1*s + 9*a)/(s^3 + 9*s)
Gp =
 
  10 s^2 + 15 s + 27
  ------------------
      s^3 + 9 s
 
Continuous-time transfer function.
% Plant state-space
A   = [0  1  0;
       0  0  1;
       0 -9  0];
B   = [a+b2;
       3*b1;
       9*a-9*(a+b2)];
C   = [1 0 0];
D   = 0;
sys = ss(A, B, C, D)
sys =
 
  A = 
       x1  x2  x3
   x1   0   1   0
   x2   0   0   1
   x3   0  -9   0
 
  B = 
        u1
   x1   10
   x2   15
   x3  -63
 
  C = 
       x1  x2  x3
   y1   1   0   0
 
  D = 
       u1
   y1   0
 
Continuous-time state-space model.
% Check result if they are equivalent Gp = Gq
Gq  = tf(sys)
Gq =
 
  10 s^2 + 15 s + 27
  ------------------
      s^3 + 9 s
 
Continuous-time transfer function.

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Sam Chak on 30 Nov 2023

The symbolic state-space in my previous answer is realized in the Observable Companion Form, which happens to be my preferred state-space form in most design cases. The state

represents the output of the transfer function

. If the initial condition is known, then

. However,

and

denote the unmeasurable internal states of the system. For instance, if

represents position, then the velocity (rate of change of position) is given by

. In other words, the velocity is a function of

and u,

.

Most lectures focus on teaching how to obtain the Controllable Canonical Form or the Observable Canonical Form realization of the transfer function

. This emphasis is due to the intuitive Transfer-Function-to-State-Space conversion that can be achieved without mathematical calculations.

In the Controllable Canonical Form, the output of

is equivalently the sum of

,

, and

. Often, the output

represents a measurable physical quantity. However, there are instances where not all state variables

can be directly measured. In such cases, we can attempt to construct an observer to estimate these variables by measuring only the output

.

I'm unsure about what you want to do with the symbolic state-space. One reason I can think of for wanting to obtain the symbolic state-space is the need to perform calculations that require knowledge of matrices A and B, such as in the case of LQR. Unfortunately, the functions from the Control System Toolbox cannot handle symbolic objects directly. Thus, you need some workarounds.

State-space in Controllable Canonical Form:

% Parameters
a   = 3;
b1  = 5;
b2  = 7;
% Plant transfer function
s   = tf('s');
Gp  = ((a + b2)*s^2 + 3*b1*s + 9*a)/(s^3 + 9*s)
Gp =
 
  10 s^2 + 15 s + 27
  ------------------
      s^3 + 9 s
 
Continuous-time transfer function.
[num, den] = tfdata(Gp, 'v');
% State-space in Controllable Canonical Form
A   = [     0       1       0;
            0       0       1;
       -den(4) -den(3) -den(2)];
B   = [0;
       0;
       1];
C   = [num(4) num(3) num(2)];
D   =  0;
sys = ss(A, B, C, D)
sys =
 
  A = 
       x1  x2  x3
   x1   0   1   0
   x2   0   0   1
   x3   0  -9   0
 
  B = 
       u1
   x1   0
   x2   0
   x3   1
 
  C = 
       x1  x2  x3
   y1  27  15  10
 
  D = 
       u1
   y1   0
 
Continuous-time state-space model.
% Check result if they are equivalent Gp = Gq
Gq  = tf(sys)
Gq =
 
  10 s^2 + 15 s + 27
  ------------------
      s^3 + 9 s
 
Continuous-time transfer function.

Sam Chak on 30 Nov 2023

I am performing an analysis on how the variation of alpha, beta1, and beta2 effect the dynamics of my system (the state space response).

Obtaining the time responses of the system requires some real values for α,

, and

. Therefore, it cannot be purely symbolic. Also, if the initial condition is zero, then it is unnecessary to convert the transfer function to state-space. However, if the initial condition is non-zero, it becomes necessary to convert the transfer function to state-space. This is because the lsim(sys, u, t, x0) command can specify a vector x0 of initial state values only when sys is a state-space model.

Paul on 30 Nov 2023

Edited: Paul on 1 Dec 2023

@Ali Almakhmari

Let's see the code you tried with tf2ss and we can see if it can be sorted out. tf2ss worked for me.

I still don't know what additional information you're trying to gain from the state space realization that you're not able to get from the transfer function.

Answer 2

Paul on 1 Dec 2023

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Moved: Sam Chak on 2 Dec 2023

Hi Sam,

I was hoping that the OP would show a little more effort before giving the answer. Anyway ...

The code should be modified to use the 'all' input to coeffs so as to return the 0 coefficients as well. That way we can use dencoeff as well, which is what we'd want in general, and not return numeric A and D matrices

syms s alpha beta_1 beta_2

assume(alpha, 'real');

assume(beta_1, 'real');

assume(beta_2, 'real');

%% Plant transfer function in symbolic form

Gp = ((alpha + beta_2)*s^2 + 3*beta_1*s + 9*alpha)/(s^3 + 0*s^2 + 9*s + 0)

Gp =

[num, den] = numden(Gp)

num =

den =

[numcoeff, numterm] = coeffs(num, s, 'all')

numcoeff =

numterm =

[dencoeff, denterm] = coeffs(den, s, 'all')

dencoeff =

denterm =

[A, B, C, D] = tf2ss(numcoeff, dencoeff)

A =

B =

C =

D =

0

simplify(C*inv(s*eye(3)-A)*B + D) % verify

ans =

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Sam Chak on 2 Dec 2023

Thank you, @Paul.

Don't mind the OP. I'm also learning new things from you. Thus, I believe your proposed solution in the comment should be the true answer to this question because you have demonstrated how to execute this correctly in MATLAB. More importantly, it deserves my vote.

Answer 3

Sam Chak on 1 Dec 2023

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@Paul's method is to use tf2ss(). In the past, I used this approach, but now I no longer use it since learning that the syntax ss(tf(num, den)) can achieve what I want. I also wasn't aware that tf2ss() can accept inputs of 'sym' (symbolic) data type.

syms s alpha beta_1 beta_2

assume(alpha, 'real');

assume(beta_1, 'real');

assume(beta_2, 'real');

%% Plant transfer function in symbolic form

Gp = ((alpha + beta_2)*s^2 + 3*beta_1*s + 9*alpha)/(s^3 + 0*s^2 + 9*s + 0)

Gp =

%% tf2ss(num, den) requires inputs of numerator and denominator in vector form

[num, den] = numden(Gp)

num =

den =

[numcoeff, numterm] = coeffs(num, s)

numcoeff =

numterm =

[dencoeff, denterm] = coeffs(den, s)

dencoeff =

denterm =

%% check data type

class(numcoeff)

ans = 'sym'

%% Obtain state-space matrices in symbolic form

[A, B, C, D] = tf2ss(numcoeff, [1 0 9 0])

A = 3×3

0 -9 0 1 0 0 0 1 0

B =

C =

D =

0

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