Dual integral equations involving wavelet transforms (Q2906716)

Dual integral equations involving trigonometrical functions and other special functions have been investigated by researchers. This paper focuses on dual integral equations involving wavelet transforms. Under some constraints, dual integral equations involving wavelet transforms are solved using the theory of convolution and reconstruction formulas for the wavelet transform. As a special case, wavelets generated by Tanno's convolution kernels are investigated and the solutions of the corresponding dual integral equations are provided.NEWLINENEWLINEReviewer's remark: The symbols \(G^{(q)}(t)\) and \(H^{(q)}(t)\) are not explained properly. Some other symbols are also unclear. As the author points out, the determination of \(\phi^{*}\) and \(\psi^{*}\) satisfying (2.5) is a basic problem which is alsno treated (at the right place). In summary, the organization of this article could be improved.