Hermitian hat wavelet

This article is missing information about Hermitian hat wavelet phase plot is defined as (theta) (t/a) equals tan-1 [(ds/dt)/(-d2s/dt2] equals tan-1 [((d(delta) (t/a)dt) (direct product) s)/((d2(delta) (t/a)/dt2) (direct product) s)]. Please expand the article to include this information. Further details may exist on the talk page. (December 2019)

The Hermitian hat wavelet is a low-oscillation, complex-valued wavelet. The real and imaginary parts of this wavelet are defined to be the second and first derivatives of a Gaussian, respectively:

${\displaystyle \mathrm{\Psi }(t)=\frac{2}{\sqrt{5}}{\pi }^{-\frac{1}{4}}(1-t^2+it)e^{-\frac{1}{2}{t}^2}.}$

The Fourier transform of this wavelet is:

${\displaystyle \hat{\mathrm{\Psi }}(\omega )=\frac{2}{\sqrt{5}}{\pi }^{-\frac{1}{4}}\omega (1+\omega )e^{-\frac{1}{2}{\omega }^2}.}$

The Hermitian hat wavelet satisfies the admissibility criterion. The prefactor ${\displaystyle C_{\mathrm{\Psi }}}$ in the resolution of the identity of the continuous wavelet transform is:

${\displaystyle C_{\mathrm{\Psi }}=\frac{16}{5}\sqrt{\pi }.}$

This wavelet was formulated by Szu in 1997 for the numerical estimation of function derivatives in the presence of noise. The technique used to extract these derivative values exploits only the argument (phase) of the wavelet and, consequently, the relative weights of the real and imaginary parts are unimportant.

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