Nonrecursive filter
Technique in mathematics and signal processing From Wikipedia, the free encyclopedia
In mathematics, a nonrecursive filter only uses input values like x[n − 1], unlike recursive filter where it uses previous output values like y[n − 1].
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In signal processing, non-recursive digital filters are often known as Finite Impulse Response (FIR) filters, as a non-recursive digital filter has a finite number of coefficients in the impulse response h[n].[1]
Examples:
- Non-recursive filter: y[n] = 0.5x[n − 1] + 0.5x[n]
- Recursive filter: y[n] = 0.5y[n − 1] + 0.5x[n]
An important property of non-recursive filters is, that they will always be stable. This is not always the case for recursive filters.
References
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