Radon and Fourier transforms for D-modules

In this paper we deal with Radon transforms for generalized flag manifolds in the framework of quasi-equivariant D-modules. We shall follow the method employed by Baston-Eastwood and analyze the Radon transform using the Bernstein-Gelfand-Gelfand resolution and the Borel-Weil-Bott theorem. We shall

Orientation and spacing are important features of fringe patterns, especially in speckle photography when the displacement information of the object is determined by pointwisely ÿltering the double-exposure specklegram. The Fourier transform and Radon transform are both simple and e ective tools for

We prove Sobolev inequalities for singular and fractional Radon transforms which are defined as in a paper of Phong and Stein under certain hypothesis on the corresponding Lagrangian ((N\*C)$) which does not necessarily have to be a canonical graph. In the proof we use oscillatory integrals, the Cot