Wavelets associated with nonuniform multiresolution analysis on positive half-line (Q2911904)

Recently, orthogonal compactly supported \(p\)\,-wavelets related to the generalized Walsh functions have been constructed [\textit{Y. A. Farkov}, Izv. Math. 69, No. 3, 623--650 (2005); translation from Izv. Ross. Akad. Nauk, Ser. Mat. 69, No. 3, 193--220 (2005; Zbl 1086.43006); J. Approx. Theory 161, No. 1, 259--279 (2009; Zbl 1205.42030)]. For all integers \(p\geq 2\) these wave ca be identified with certain lacunary Walsh series. The paper under review introduces nonuniform multiresolution \(p\)\,-analysis in \(L^{2}({\mathbb R}_+)\) with a compactly supported scaling function \(\varphi\) defined, via the Walsh-Fourier transform, by a generalized Walsh polynomial \(m_0\) satisfying appropriate conditions. Also, the authors prove an analogue of Cohen's condition for the orthonormality of the system \(\{\varphi(x \ominus \lambda)\,| \;\lambda\in\Lambda_+ \}\) where \(\Lambda_+ = \{0, r/N\} + {\mathbb Z}_+\), \(N>1\) (an integer) and \(r\) is an odd integer with \(1\leq r\leq 2N - 1\) such that \(r\) and \(N\) are relatively prime.