o relationships in time and frequency

State space systems Page 1 / 1

(Blank Abstract)

I/o and i/s/o representation of siso linear systems


I/O	I/S/O
variables: $(u, y)$	variables: $(u, x, y)$
$t q y t t p u t, n deg q deg p$	$t x t A x t B u t, y t C x t D u t$
$u t, y t$	$x t n, A B C D n 1 n 1$
Impulse Response
$t q h t t p δ t$	$h t D δ t C A t B, t 0$
$H s ℒ h t p s q s$	$H s D C s I A B$
Poles - characteristic roots - eigenfrequencies
$λ_{i}, q λ_{i} 0, I 1, \dots, n$	$λ_{i} I A 0$
Zeros
$H z_{i} 0 \Leftrightarrow p z_{i}, 1, \dots, n$	$z_{i} I A -B -C -D 0$
Matrix exponential
$A t k 0$ ∞ t k k A k t A t A A t A t A
$ℒ A t s I A$
BIBO stability
$y h u$ , requirement
$u Norm u$ ∞ ∞ u ∞ ∞
$\Leftrightarrow h_{1} t 0$ ∞ h t ∞
$\Leftrightarrow λ_{i} 0 \Leftrightarrow poles LHP$
Solution in the time domain
$y t y_{zi} t y_{zs} t$	$x t x_{zi} t x_{zs} t$
$y t I 1 n c_{i} λ_{i} t τ 0^{-} t h t τ u τ$	$x t A t x 0^{-} τ 0^{-} t A t τ B u τ$
	$y t C A t x 0^{-} τ 0^{-} t D δ t τ C A t τ B u τ, h · D δ t τ C A t τ B$
	$y t C A t x 0^{-} τ 0^{-} t h t τ u τ$
Laplace Transform: Solution in the frequency domain
$Y s r s q s H s U s$	$X s s I A x 0^{-} s I A B U s$
	$Y s C s I A x 0^{-} D C s I A B U s, H s D C s I A B$

Let $H s D p s q s$ , $deg p deg q$ . Define $w$ so that $t q w t u t$ , $y t t p w D u t x^{T} w w 1 … w n 1 n$ , $n$ : degree of $q s$ .

Zero-input or free response

response due to initial conditions alone.

Zero-state or forced response

response due to input (forcing function) alone (zero initial condition).

Homogeneous solution

general form of free-response (arbitrary initial conditions).

Particular solution

forced response.

Steady-state response

response obtained for large balues of time

T

∞ .

Transient response

full response minus steady minus state response.

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Source: OpenStax, State space systems. OpenStax CNX. Jan 22, 2004 Download for free at http://cnx.org/content/col10143/1.3

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