New system of Kravchenko orthogonal wavelets \(\{ \widetilde {\text{up}(t)}\}\) (Q1048568)

The authors introduce an orthogonal wavelet \(\psi\). This wavelet is associated with a multiresolution analysis with scaling scaling function \(\varphi\) with compactly supported Fourier transform, given by \[ \widehat{\varphi}(x) =\sqrt{up((3/2\pi)x+1)+up((3/2\pi)x+up((3/2\pi)x-1)}. \] The function \(up\) is not explicitly defined in the article. The reader is referred to other works, e.g. \textit{Yu. V. Gulyaev, V. F. Kravchenko} and \textit{V. I. Pustovoit} [Dokl. Math. 75, No. 2, 325--332 (2007); translation from Dokl. Akad. Nauk, Ross. Akad. Nauk 413, No. 3, 320--328 (2007; Zbl 1175.78035) and Dokl. Phys. 52, No. 12, 645--652 (2007; Zbl 1179.94032)], and \textit{V. F. Kravchenko} [Lectures on the Theory of Atomic Functions and Some Applications (in Russian). Radiotekhnika, Moscow (2003)]. There are some obscurities in the text, possibly due to typographical errors.