Welch's method

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In physics, engineering, and applied mathematics, Welch's method, named after P.D. Welch, is used for estimating the power of a signal vs. frequency, reducing noise compared to the methods it is based upon. Welch's method is based on the concept of using periodogram spectrum estimates, which converts a signal from the time domain to the frequency domain. Welch's method is an improvement on the standard periodogram spectrum estimating method and Bartlett's method in that it reduces noise in the estimated power spectra in exchange for reducing the frequency resolution. Due to the noise caused by imperfect and finite data, the noise reduction from Welch's method is often desired.

The Welch method is based on Bartlett's method and differs in two ways:

1. The signal is split up into overlapping segments: The original data segment is split up into L data segments of length M, overlapping by D points.
   1. If D = M / 2, the overlap is said to be 50%
   2. If D = 0, the overlap is said to be 0%. This is the same situation as in the Bartlett's method.
2. The overlapping segments are then windowed: After the data is split up into overlapping segments, the individual L data segments have a window applied to them (in the time domain).
   1. Most window functions afford more influence to the data at the center of the set than to data at the edges, which represents a loss of information. To mitigate that loss, the individual data sets are commonly overlapped in time (as in the above step).
   2. The windowing of the segments is what makes the Welch method a "modified" periodogram.

After doing the above, the periodogram is calculated by computing the discrete Fourier transform, and then computing the squared magnitude of the result. The individual periodograms are then time-averaged, which reduces the variance of the individual power measurements. The end result is an array of power measurements vs. frequency "bin".

This method is used by MATLAB's (or Octave's) pwelch command to calculate spectral density.

DADiSP provides the wspd function to compute the Welch spectral density that also conforms to Parseval's theorem.

• Spectral density estimation

Other overlapping windowed Fourier transforms include:

• Modified discrete cosine transform
• Short-time Fourier transform

• Welch, PD; The Use of Fast Fourier Transform for the Estimation of Power Spectra: A Method Based on Time Averaging Over Short, Modified Periodograms", IEEE Transactions on Audio Electroacoustics, Volume AU-15 (June 1967), pages 70–73.

• Oppenheim, Alan V.; Schafer, Ronald W. (1975). Digital signal processing. Englewood Cliffs, N.J.: Prentice-Hall. pp. 548–554. ISBN 0-13-214635-5. {{cite book}}: Cite has empty unknown parameter: |coauthors= (help)CS1 maint: multiple names: authors list (link)

• Proakis, J.G. and Manolakis, D.G.; Digital Signal Processing, Upper Saddle River, NJ: Prentice-Hall, 1996, pp 910–913.