THE POST-GAUSSIAN WAVELET
Pages 31-34
V.I.R.Niculescu, Rodica M.Ion, Claudia Stancu, Minola Leonovici, V.Babin
Abstract
One way to decompose arbitrary signals are the procedures of wavelet transforms. The localized contributions to signals are characterized by the scale parameter and the localization parameters. In this brief report we introduced a new family of post - Gaussian wavelets. This new wavelet is an algebraic not a exponential one, so reducing the computation time. The new wavelet for great orders (tending to infinity) describes the classical Morlet wavelet.