Add to ORKGGiven a real-valued function on R-n we study the problem of recovering the function from its spherical means over spheres centered on a hyperplane. An old paper of Bukhgeim and Kardakov derived an inversion formula for the odd n case with great simplicity and economy. We apply their method to derive an inversion formula for the even n case. A feature of our inversion formula, for the even n case, is that it does not require the Fourier transform of the mean values or the use of the Hilbert transform, unlike the previously known inversion formulas for the even n case. Along the way, we extend the isometry identity of Bukhgeim and Kardakov for odd n, for solutions of the wave equation, to the even n case
Spherical means are well-known useful tool in the theory of partial differential equations with appl...
We propose iterative inversion algorithms for weighted Radon transforms $R_W$ along hyperplanes in $...
The Radon transform that integrates a function in ${open H}^n$, the $n$-dimensional hyperbolic space...
Given a real-valued function on R-n we study the problem of recovering the function from its spher...
Abstract. Suppose D is a bounded, connected, open set in Rn and f a smooth function on Rn with suppo...
Recovering a function from its spherical Radon transform with centers of spheres of integration rest...
AbstractWe consider the spherical mean operator R and its dual tR. We establish some results from ha...
We derive explicit formulae for the reconstruction of a function from its integrals over a family of...
AbstractWe consider the spherical mean operator R and its dual tR. We establish some results from ha...
The following problem arises in thermoacoustic tomography and has intimate connection with PDEs and ...
Abstract. Suppose D is a bounded, connected, open set in Rn and f is a smooth function on Rn with su...
A spherical Radon transform whose integral domain is a sphere has many applications in partial diffe...
We develop isometry and inversion formulas for the Segal–Bargmann transform on odd-dimensional hyper...
The author considers the problem of reconstructing a continuous function on Rn from certain values o...
Spherical means are well-known useful tool in the theory of partial differential equations with appl...
Spherical means are well-known useful tool in the theory of partial differential equations with appl...
We propose iterative inversion algorithms for weighted Radon transforms $R_W$ along hyperplanes in $...
The Radon transform that integrates a function in ${open H}^n$, the $n$-dimensional hyperbolic space...
Given a real-valued function on R-n we study the problem of recovering the function from its spher...
Abstract. Suppose D is a bounded, connected, open set in Rn and f a smooth function on Rn with suppo...
Recovering a function from its spherical Radon transform with centers of spheres of integration rest...
AbstractWe consider the spherical mean operator R and its dual tR. We establish some results from ha...
We derive explicit formulae for the reconstruction of a function from its integrals over a family of...
AbstractWe consider the spherical mean operator R and its dual tR. We establish some results from ha...
The following problem arises in thermoacoustic tomography and has intimate connection with PDEs and ...
Abstract. Suppose D is a bounded, connected, open set in Rn and f is a smooth function on Rn with su...
A spherical Radon transform whose integral domain is a sphere has many applications in partial diffe...
We develop isometry and inversion formulas for the Segal–Bargmann transform on odd-dimensional hyper...
The author considers the problem of reconstructing a continuous function on Rn from certain values o...
Spherical means are well-known useful tool in the theory of partial differential equations with appl...
Spherical means are well-known useful tool in the theory of partial differential equations with appl...
We propose iterative inversion algorithms for weighted Radon transforms $R_W$ along hyperplanes in $...
The Radon transform that integrates a function in ${open H}^n$, the $n$-dimensional hyperbolic space...