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<big>'''The Laurent Series in DSP'''</big>
 
<big>'''The Laurent Series in DSP'''</big>
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''Erik Jensen''
 
''Erik Jensen''
  
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The Laurent series is a way to descrive any analytic function that has its domain on the complex plane. Much like the Taylor Series it is a sum of a variable to a power multiplied by a corresponding coefficient. However, the Laurent series also has the ability to describe functions with poles, by containing negative powers of the complex variable (represented by '''z''') as well. The Laurent series is the link in DSP between the Discrete Fourier Transform ('''DFT''') and the Z-Transform.
 
The Laurent series is a way to descrive any analytic function that has its domain on the complex plane. Much like the Taylor Series it is a sum of a variable to a power multiplied by a corresponding coefficient. However, the Laurent series also has the ability to describe functions with poles, by containing negative powers of the complex variable (represented by '''z''') as well. The Laurent series is the link in DSP between the Discrete Fourier Transform ('''DFT''') and the Z-Transform.
  
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'''The Taylor Series'''
 
'''The Taylor Series'''
  

Revision as of 20:21, 23 April 2017

The Laurent Series in DSP

Erik Jensen


Introduction:

The Laurent series is a way to descrive any analytic function that has its domain on the complex plane. Much like the Taylor Series it is a sum of a variable to a power multiplied by a corresponding coefficient. However, the Laurent series also has the ability to describe functions with poles, by containing negative powers of the complex variable (represented by z) as well. The Laurent series is the link in DSP between the Discrete Fourier Transform (DFT) and the Z-Transform.

___________________________________________________________________________________________________________________________________________________ The Taylor Series


Background

There are a few terms that have to be defined to discuss the Laurent series. The first is residue, the The second


Applications in DSP

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