Inversion ofk-Plane Transforms via Continuous Wavelet Transforms

Wavelet analysis is a universal and promising tool with very rich mathematical content and great potential for applications in various scientific fields, in particular, in signal (image) processing and the theory of differential equations. On the other hand distributions are widely used in these fie

It has been recognized for some time now that certain high-frequency information concerning planar densities f in a neighborhood of a point can be recovered from data which consist of averages of f over lines that are relatively close to that point. The wavelet transform of f is a classical tool for

A special type of weighted wavelet transforms is introduced and the relevant Calderón reproducing formula for functions f ∈ L p (IR n ) is proved. By making use of these wavelet-type transforms a new inversion formula of the classical Bessel potentials is obtained.

Let P be the affine group of the real line R, and let HI be the set of all quaternions. Thus, L'(R, W; &x) denotes the space of all square integrable W-valued functions. From the viewpoint of square integrable group representations, we study the theory of continuous wavelet transforms on L2(R,W; do

In this paper, we study a generalization of the Donoho-Johnstone denoising model for the case of the translation-invariant wavelet transform. Instead of softthresholding coefficients of the classical orthogonal discrete wavelet transform, we study soft-thresholding of the coefficients of the transla