Time-invariant system
Overview
- If the input signal
produces an output 
then any time shifted input, 
, results in a time-shifted output 
This property can be satisfied if the transfer function
Transfer function
A transfer function is a mathematical representation, in terms of spatial or temporal frequency, of the relation between the input and output of a linear time-invariant system. With optical imaging devices, for example, it is the Fourier transform of the point spread function i.e...
of the system is not a function of time except expressed by the input and output.
This property can also be stated in another way in terms of a schematic
- If a system is time-invariant then the system block is commutative with an arbitrary delay.
To demonstrate how to determine if a system is time-invariant then consider the two systems:
- System A:
- System B:
Since system A explicitly depends on t outside of
and 
then it is time-variant.Time-variant system
A time-variant system is a system that is not time invariant . Roughly speaking, characteristics of its output depend explicitly upon time.- Overview :...
System B, however, does not depend explicitly on t so it is time-invariant.
A more formal proof of why system A & B from above differ is now presented.
To perform this proof, the second definition will be used.
System A:
- Start with a delay of the input
- Now delay the output by
- Clearly
, therefore the system is not time-invariant.
System B:
- Start with a delay of the input
- Now delay the output by
- Clearly
, therefore the system is time-invariant.
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