訊號與系統/線性常微分方程式描述之LTI系統的頻率響應

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一LTI系統可以用N 階常微分方程式來描述：

       ${\displaystyle {\displaystyle \sum _{n=0}^N}{a}_n\frac{d^{n}y(t)}{d{t}^n}={\displaystyle \sum _{m=0}^M}{b}_m\frac{d^{m}x(t)}{d{t}^m},M\le N;a_n}$和${\displaystyle b_m}$為常數

等式兩邊做傅立葉轉換，可得

       ${\displaystyle {\displaystyle \sum _{n=0}^N}{a}_n(j2\pi f{)}^{n}Y(f)={\displaystyle \sum _{m=0}^M}{b}_m(j2\pi f{)}^{m}X(f)}$
      ${\displaystyle \iff Y(f){\displaystyle \sum _{n=0}^N}{a}_n(j2\pi f{)}^n=X(f){\displaystyle \sum _{m=0}^M}{b}_m(j2\pi f{)}^m}$

LTI系統的頻率響應：

       ${\displaystyle H(f)=\frac{Y(f)}{X(f)}=\frac{{\displaystyle \sum _{m=0}^M}{b}_m(j2\pi f{)}^m}{{\displaystyle \sum _{n=0}^N}{a}_n(j2\pi f{)}^n}}$

一連續時間LTI系統的輸出訊號y(t)與輸入訊號x(t)的關係為一階常微分方程 式：

      ${\displaystyle \frac{dy}{dt}+3y(t)=\frac{dx(t)}{dt}+x(t)}$

請用傅立葉轉換求系統的頻率響應及脈衝響應。

【解】將等號兩邊做傅立葉轉換，可得

      ${\displaystyle 𝒋2\pi fY(f)+3Y(f)=j2\pi fX(f)+X(f)}$
     ${\displaystyle \iff (j2\pi f+3)Y(f)=(j2\pi f+1)X(f)}$

系統的頻率響應：

      ${\displaystyle H(f)=\frac{Y(f)}{X(f)}=\frac{j2\pi f+1}{j2\pi f+3}=1-\frac{2}{j2\pi f+3}}$

${\displaystyle H(f)}$之傅立葉逆轉換，我們可得到系統的脈衝響應為

      ${\displaystyle 𝒉(t)=\delta (t)-2e^{-3t}u(t)}$

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一RC串聯電路如下圖，試求此電路之轉換函數。 ...........圖 © Rodger E. Ziemer, William H. Tranter, D. Ronald Fannin, Signals & Systems: Continuous and Discrete, 4thed., Prentice Hall International, 1998.

【解】(1)依照電路學的分析方法，此一電路之微分方程式

      ${\displaystyle RC\frac{dy(t)}{dt}+y(t)=x(t)}$

等號兩邊取傅立葉轉換

      ${\displaystyle 𝑹C(j2\pi f)Y(f)+Y(f)=X(f)}$
     ${\displaystyle \Rightarrow H(f)=\frac{Y(f)}{X(f)}=\frac{1}{1+j2\pi fRC}}$

(2)用第三章方法求電路的單位脈衝響應：

     ${\displaystyle h(t)=\frac{1}{RC}exp(-t/RC)u(t)}$
  故${\displaystyle H(f)=\mathrm{\Im }[h(t)]=\frac{1}{RC}\frac{1}{\frac{1}{RC}+j2\pi f}=\frac{1}{1+j2\pi fRC}}$

(3)使用交流穩態分析方法

     ${\displaystyle \overrightarrow{Y}=\frac{\frac{1}{j\omega C}}{R+\frac{1}{j\omega C}}\overrightarrow{X}}$  其中${\displaystyle \mathit{\omega }=2\pi f}$
    ${\displaystyle \Rightarrow H(f)=\frac{\overrightarrow{Y}}{\overrightarrow{X}}=\frac{\frac{1}{j2\pi fC}}{R+\frac{1}{j2\pi fC}}=\frac{1}{1+j2\pi fRC}[=\frac{1}{1+j\omega RC}]}$

${\displaystyle x_T(t)=x(t)rect(\frac{t}{\tau })}$為一能量訊號，其能量密度頻譜

     ${\displaystyle G_{xT}(f)=\mid X_T(f){\mid }^2}$

系統輸出訊號${\displaystyle y(t)}$的功率密度頻譜：

     ${\displaystyle S_y(f)=\lim }$

...............圖....(沒編號)......................... 假設系統輸入訊號${\displaystyle x(t)}$為能量訊號，其能量密度頻譜：

      ${\displaystyle G_x(f)=\mid X(f){\mid }^2}$

若LTI系統為BIBO穩定，則其輸出訊號${\displaystyle y(t)}$亦為能量訊號 輸出訊號${\displaystyle y(t)}$的能量密度頻譜為

      ${\displaystyle G_y(f)=\mid Y(f){\mid }^2=\mid X(f){\mid }^2\mid H(f){\mid }^2=\mid H(f){\mid }^2{G}_x(f)}$

即：輸出訊號${\displaystyle y(t)}$能量密度頻譜為輸入訊號${\displaystyle x(t)}$的能量密度頻譜乘上${\displaystyle \mid H(f){\mid }^2}$

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假設系統輸入訊號${\displaystyle x(t)}$為功率訊號，其功率密度頻譜

      ${\displaystyle S_x(f)=\underset{T\to \mathrm{\infty }}{\lim }\frac{1}{T}\mid X_T(f){\mid }^2}$ 
     其中 
      ${\displaystyle X_T(f)=\mathrm{\Im }[x(t)rect(\frac{t}{T})]}$

${\displaystyle X_T(t)=x(t)rect(\frac{t}{\tau })}$為一能量訊號，其能量密度頻譜

      ${\displaystyle G_{xT}(f)=\mid X_T(f){\mid }^2}$

系統輸出訊號${\displaystyle y(t)}$的功率密度頻譜：

      ${\displaystyle S_y(f)=\underset{T\to \mathrm{\infty }}{\lim }\frac{1}{T}\mid H(f){\mid }^2{G}_{xT}(f)=\mid H(f){\mid }^2\underset{T\to \mathrm{\infty }}{\lim }\frac{1}{T}\mid X_T(f){\mid }^2=\mid H(f){\mid }^2{S}_x(f)}$