Mellin transform

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English

Template:Wikipedia

Alternative forms

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Etymology

Named after Finnish mathematician Template:W.

Noun

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Template:Lb An integral transform that may be regarded as the multiplicative version of the two-sided Laplace transform.
- Template:Quote-book
- 2005, Robb J. Muirhead, Aspects of Multivariate Statistical Theory, John Wiley & Sons, page 303,
  If $X$ is a positive random variable with density function $f (x)$ , the Mellin transform $M (s)$ gives the $(s - l)$ th moment of $X$ . Hence Theorem 8.2.6 gives the Mellin transform of $W$ evaluated at $s = h + 1$ ; that is,
  $M (h + 1) = E (W^{h})$ .
  
  The inverse Mellin transform gives the density function of $W$ .
- Template:Quote-book

Further reading

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