Generalized Discrete Radon Transforms and Their Use in the Ridgelet Transform

## Abstract The present paper deals with the interaction between the multidimensional Hilbert transform and the Radon transform in Clifford analysis, both transforms being protagonists in multidimensional signal analysis theory. In an attempt to complete the picture, we consider in particular the a

The problem of reconstructing a binary function, f, de-0 or 1 with 0 °f (z) °1, and (b) using a linear programming fined on a finite subset of a lattice ‫,ޚ‬ from an arbitrary collection of (LP) method to search for a feasible solution to Equation (1) its partial-sums is considered. The approach we

We prove that under certain conditions the inversion problem for the generalized Radon transform reduces to solvinga Fredholm integral equation and we obtain the asymptoticexpansionof the symbolof the integral operator in this equation. We consider applications of the generalized Radon transform to

In this paper, a fast algorithm for the computation of two-dimensional image moments is proposed. In our approach, a new discrete Radon transform (DRT) is used for the major part of the algorithm. The new DRT preserves an important property of the continuous Radon transform that the regular or geome