The continuous wavelet transform in \(n\)-dimensions (Q2819176)

The paper is well written, with many details. It gives generalizations of the \(n\)-dimensional inversion formula for the continuous wavelet transform (see for example \textit{I. Daubechies} in her book [Ten lectures on wavelets. Philadelphia, PA: SIAM (1992; Zbl 0776.42018)]). In fact, I. Daubechies used a family of wavelets \(\psi_{a,b}\) with parameters \(a>0\) and \(b\in\mathbb{R}^n\); in the present paper, the authors show that \(a\) can be chosen in \(\mathbb{R}^n\) (with \(a_j\neq 0\) for all \(j\)); they also deal with \(L^2\) and pointwise convergence.