Linear system by Meiling CHEN1 Lesson 6 State transition matrix Linear system 1. Analysis.

linear system by Meiling CHEN 1

Lesson 6

State transition matrix

Linear system1. Analysis


)()()(

)()()(

tDutCxty

tButAxtxdt

d

1. Homogeneous solution of x(t) 2. Non-homogeneous solution of x(t)

The behavior of x(t) et y(t) :


Homogeneous solution

)0()()(

)()0()(

)()(

1 xAsIsX

sAXxssX

tAxtx

)0(

)0(])[()( 11

xe

xAsILtxAt

])[()( 11

AsILet At


)()()()()(

)()0(

)0()(

000)(

0

0

0

00

0

0

txtttxetxeetx

txex

xetx

ttAAtAt

At

At


Properties

)()(.5

)()()(.4

)()()0(.3

)()(.2

)0(.1

020112

1

ktt

tttttt

txtx

tt

I

k

])[()( 11

AsILet At


Non-homogeneous solution

)()()(

)()()(

tDutCxty

tButAxtxdt

d

tdButxttx

sBUAsILxAsILtx

sBUAsIxAsIsX

sBUxsXAsI

sBUsAXxssX

0

1111

11

)()()0()()(

)]()[()0(])[()(

)()()0()()(

)()0()()(

)()()0()(

Convolution

Homogeneous


)()()()()()(

)()()()()(

)()()0()()(

0

0

00

00

0

tDudButCtxttCty

dButtxtttx

dButxttx

t

t

t

t

t

Zero-input response Zero-state response


Example 1

Txlet

tux

x

x

x

00)0(

)(1

0

32

10

2

1

2

1

tttt

tttAt

eeee

eeeeeAsILt

22

21211

222

2])[()(

t

dButxttx0

)()()0()()(

tt

tt

ee

eex

x

2

2

2

1

222

32

2

1

Ans: )]()[( 11 sBUAsIL


Txlet

tux

x

x

x

00)0(

)(1

0

32

10

2

1

2

1

1s 1s1 1

32

u y1x2x

s

x )0(2

s

x )0(1

Using Maison’s gain formula

)()0()0(2

)(

)()0()0()31(

)(

231

1

2

1

1

2

2

2

2

2

1

11

1

21

sUs

xs

xs

sx

sUs

xs

xss

sx

ss


How to find

])[()( 11

AsILet At


Methode 1: ])[()( 11 AsILt

Methode 3: Cayley-Hamilton Theorem

Methode 2: Atet )(


Methode 1: ])[()( 11 AsILt

3

2

1

2

1

2

1

3

2

1

3

2

1

1

0

0

0

0

1

)(

)(

10

01

00

211

340

010

x

x

x

ty

ty

u

u

x

x

x

x

x

x

ssss

ss

sss

ssss

AsI

AsIadjAsI

414

323

32116

33)2)(4(

1

)()(

2

2

2

1


Methode 2: Atet )(

3

2

1

2

1

2

1

3

2

1

3

2

1

166)(

)(

1

1

1

300

020

001

x

x

x

ty

ty

u

u

x

x

x

x

x

x

t

t

t

At

e

e

e

et3

2

00

00

00

)(

diagonal matrix


Diagonization


Case 1: distincti

)1)(3(43

1

43

10

A

1

3

2

1

3

10

433

13)(

2

1

2

111 v

v

v

vVAI

1

10

33

11)(

2

1

2

122 v

v

v

vVAI

depend

10

03

13

11 121 APPVVP


n 321

In the case of A matrix is phase-variable form and

112

11

2121

111

nn

nn

nnvvvP

Vandermonde matrix

for phase-variable form

4

3

2

1

1

APP

1 PPee tAt


Case 1: distincti

)2)(1)(1(

200

010

101

200

010

101

AIA

0

100

000

100

)(

3

2

1

11

v

v

v

VAI21

depend

0

1

0

000

0

0

1

000

3

2

1

321

3

2

1

321

v

v

v

vvv

v

v

v

vvv

21 VV


0

000

010

101

)(

3

2

1

33

v

v

v

VAI23

1

0

1

00

3

2

1

321

v

v

v

vvv

200

010

001

100

010

1011

321 APPVVVP


Case 3: distincti Jordan form

321

formJordanAPPvvvP 1321

Generalized eigenvectors

231

121

11

)(

)(

0)(

vvAI

vvAI

vAI

1

1

11 1

1ˆ

AAPP

t

tt

tttt

tA

e

tee

etee

e1

11

12

11

2ˆ


Example:

2)2(11

13

11

13

A

1

10

11

11)(

12

11

12

1111 v

v

v

vVAI

0

1

1

1

11

11)(

22

21

22

2121 v

v

v

vVAI

20

12ˆ01

11 121 AAPPVVP

1ˆ

2

22ˆ

PPee

e

teee tAAt

t

tttA


Method 3:


AaAaIaAaAaa

AaAaAaA

IaAaAaA

IaAaAaA

nnn

nn

n

nn

n

nn

n

02

1011

11

02

111

011

1

011

1

)(

0

nn AkAkAkIkAf 2

210)(any

1

0

11

2210)(

n

k

kk

nn

A

AAAIAf


10

21?100 AAExample:

AIAAflet 10100)(

2,1,0)2)(1(20

2121

100210

10022

100110

10011

2)(

1)(

f

f

12

22100

1

1000

10

221

10

21)12(

10

01)22()(

101100100100AAf


02

13? AeAtExample:

2,1,02

1321

2)2(

)1(

102102

10110

t

t

ef

eftt

tt

ee

ee

2

1

20 2

tttt

tttt

ttttAt

eeee

eeee

eeeee

222

2

02

13)(

10

012

22

22

22

Linear system by Meiling CHEN1 Lesson 6 State transition matrix Linear system 1. Analysis.

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Transcript of Linear system by Meiling CHEN1 Lesson 6 State transition matrix Linear system 1. Analysis.