[足式机器人]Part2 Dr. CAN学习笔记-数学基础Ch0-4线性时不变系统中的冲激响应与卷积

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Dr. CAN学习笔记-数学基础Ch0-4线性时不变系统中的冲激响应与卷积

  • 1. LIT System:Linear Time Invariant
  • 2. 卷积 Convolution
  • 3. 单位冲激 Unit Impulse——Dirac Delta


线性时不变系统 : LIT System
冲激响应:Impluse Response
卷积:Convolution

1. LIT System:Linear Time Invariant

  • 运算operator : O { ⋅ } O\left\{ \cdot \right\} O{}
    I n p u t O { f ( t ) } = o u t p u t x ( t ) \begin{array}{c} Input\\ O\left\{ f\left( t \right) \right\}\\ \end{array}=\begin{array}{c} output\\ x\left( t \right)\\ \end{array} InputO{f(t)}=outputx(t)

  • 线性——叠加原理superpositin principle
    { O { f 1 ( t ) + f 2 ( t ) } = x 1 ( t ) + x 2 ( t ) O { a f 1 ( t ) } = a x 1 ( t ) O { a 1 f 1 ( t ) + a 2 f 2 ( t ) } = a 1 x 1 ( t ) + a 2 x 2 ( t ) \begin{cases} O\left\{ f_1\left( t \right) +f_2\left( t \right) \right\} =x_1\left( t \right) +x_2\left( t \right)\\ O\left\{ af_1\left( t \right) \right\} =ax_1\left( t \right)\\ O\left\{ a_1f_1\left( t \right) +a_2f_2\left( t \right) \right\} =a_1x_1\left( t \right) +a_2x_2\left( t \right)\\ \end{cases} O{f1(t)+f2(t)}=x1(t)+x2(t)O{af1(t)}=ax1(t)O{a1f1(t)+a2f2(t)}=a1x1(t)+a2x2(t)

  • 时不变Time Invariant:
    O { f ( t ) } = x ( t ) ⇒ O { f ( t − τ ) } = x ( t − τ ) O\left\{ f\left( t \right) \right\} =x\left( t \right) \Rightarrow O\left\{ f\left( t-\tau \right) \right\} =x\left( t-\tau \right) O{f(t)}=x(t)O{f(tτ)}=x(tτ)

2. 卷积 Convolution

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3. 单位冲激 Unit Impulse——Dirac Delta

LIT系统,h(t)可以完全定义系统
![在这里插入图片描述](https://img-blog.csdnimg.cn/direct/44d3e236647442a3ba8a85c7024b461b.png
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