HilbertWRe:

Filter: Extension

Applies the Real part of the Hilbert Transform to an input signal. [1]

Source: Hilbert.sc

Offers the Hilbert Transform of an input signal via Weaver's *Third Method*.^{1}

The Hilbert Transform, returning the first of two signals in *phase-quadrature*. Considered as a complex *analytic signal*, ^{2} the first may be regarded as the *real* component and the second as the *imaginary*.

[1] this is a composite pseudo UGen. HilbertWRe is built with DelayN.

in |
The input signal to transform. |

size |
The size of the FFT used for |

mul |
Output will be multiplied by this value. |

add |
This value will be added to the output. |

The real part of the Hilbert Transform.

Please review the discussion found here.

[1] - Weaver, Donald. “A Third Method of Generation and Detection of Single-Sideband Signals.” Proceedings of the IRE, vol. 44, no. 12, 1956, pp. 1703–1705.

[2] - Smith, J.O. “Analytic Signals and Hilbert Transform Filters”, in Mathematics of the Discrete Fourier Transform (DFT) with Audio Applications, Second Edition, https://ccrma.stanford.edu/~jos/st/Analytic_Signals_Hilbert_Transform.html, online book, 2007 edition, accessed 2017-08-08.

helpfile source: /Library/Application Support/SuperCollider/downloaded-quarks/Hilbert/HelpSource/Classes/HilbertWRe.schelp

link::Classes/HilbertWRe::

link::Classes/HilbertWRe::