Add to ORKGThe Radon transform is one of the most useful and applicable tools in functional analysis. First constructed by John Radon in 1917 [9] it has now been adapted to several settings. One of the principle theorems involving the Radon transform is the Support Theorem. In this paper, we discuss how the Radon transform can be constructed in the white noise setting. We also develop a Support Theorem in this setting
We prove \(L^p-L^q\) boundedness for a wide class of Radon-like transforms. The technique of proof l...
This thesis is composed of two parts, each part treating a different problem from the theory of Harm...
AbstractIt is shown that a Lévy white noise measure Λ always exists as a Borel measure on the dual K...
The Radon transform is one of the most useful and applicable tools in functional analysis. First con...
Gaussian measure is constructed for any given hyperplane in an infinite dimensional Hilbert space, a...
We study the Radon transform in the class of oscillatory distributions K\u27(Rn). We show that the s...
The classical Radon transform can be thought of as a way to obtain the density of an n-dimensional o...
In this work we extend the finite dimensional Radon transform [23] to the Gaussian measure. We devel...
Abstract. Gaussian measure is constructed for any given hyperplane in an infinite-dimensional Hilber...
AbstractLet ƒ be a rapidly decreasing continuous function on ℝn and let f be its Radon transform. If...
AbstractAn n-dimensional random vector X is said (Cambanis, S., Keener, R., and Simons, G. (1983). J...
AbstractWe give an extension of some Gaussian (in particular White Noise) Analysis objects and struc...
AbstractLet ƒ be a rapidly decreasing continuous function on ℝn and let f be its Radon transform. If...
We prove \(L^p-L^q\) boundedness for a wide class of Radon-like transforms. The technique of proof l...
Let Cc(Cn) be the space of compactly supported continuous functions onCn. For f ∈ Cc(Cn), f ̂ denote...
We prove \(L^p-L^q\) boundedness for a wide class of Radon-like transforms. The technique of proof l...
This thesis is composed of two parts, each part treating a different problem from the theory of Harm...
AbstractIt is shown that a Lévy white noise measure Λ always exists as a Borel measure on the dual K...
The Radon transform is one of the most useful and applicable tools in functional analysis. First con...
Gaussian measure is constructed for any given hyperplane in an infinite dimensional Hilbert space, a...
We study the Radon transform in the class of oscillatory distributions K\u27(Rn). We show that the s...
The classical Radon transform can be thought of as a way to obtain the density of an n-dimensional o...
In this work we extend the finite dimensional Radon transform [23] to the Gaussian measure. We devel...
Abstract. Gaussian measure is constructed for any given hyperplane in an infinite-dimensional Hilber...
AbstractLet ƒ be a rapidly decreasing continuous function on ℝn and let f be its Radon transform. If...
AbstractAn n-dimensional random vector X is said (Cambanis, S., Keener, R., and Simons, G. (1983). J...
AbstractWe give an extension of some Gaussian (in particular White Noise) Analysis objects and struc...
AbstractLet ƒ be a rapidly decreasing continuous function on ℝn and let f be its Radon transform. If...
We prove \(L^p-L^q\) boundedness for a wide class of Radon-like transforms. The technique of proof l...
Let Cc(Cn) be the space of compactly supported continuous functions onCn. For f ∈ Cc(Cn), f ̂ denote...
We prove \(L^p-L^q\) boundedness for a wide class of Radon-like transforms. The technique of proof l...
This thesis is composed of two parts, each part treating a different problem from the theory of Harm...
AbstractIt is shown that a Lévy white noise measure Λ always exists as a Borel measure on the dual K...