AbstractWe develop a Radon transform on Banach spaces using Gaussian measure and prove that if a bounded continuous function on a separable Banach space has zero Gaussian integral over all hyperplanes outside a closed bounded convex set in the Hilbert space corresponding to the Gaussian measure then the function is zero outside this set
Since the 60's $\gamma$-radonifying operators have been used in connection to Gaussian measures on B...
Let μ and μ1 be probability measures on a locally convex Hausdorff real topological linear space E. ...
Let μ and μ1 be probability measures on a locally convex Hausdorff real topological linear space E. ...
Abstract. We develop a Radon transform on Banach spaces using Gaussian measure and prove that if a b...
Abstract. Gaussian measure is constructed for any given hyperplane in an infinite-dimensional Hilber...
The classical Radon transform can be thought of as a way to obtain the density of an n-dimensional o...
Abstract. We study the Gaussian Radon transform in the classical Wiener space of Brownian motion. We...
Gaussian measure is constructed for any given hyperplane in an infinite dimensional Hilbert space, a...
AbstractLet μ and μ1 be probability measures on a locally convex Hausdorff real topological linear s...
Abstract. Let E be a separable real Banach space not containing an isomor-phic copy of c0. Let Q be ...
Abstract. There has been growing recent interest in probabilistic interpretations of kernel-based me...
In this work we extend the finite dimensional Radon transform [23] to the Gaussian measure. We devel...
Abstract. Consider a finite complex Radon measure µ in the plane whose Cauchy transform vanishes µ-a...
AbstractLet μ and μ1 be probability measures on a locally convex Hausdorff real topological linear s...
AbstractThe main purpose of this paper is threefold: Firstly, the topological support of Gaussian me...
Since the 60's $\gamma$-radonifying operators have been used in connection to Gaussian measures on B...
Let μ and μ1 be probability measures on a locally convex Hausdorff real topological linear space E. ...
Let μ and μ1 be probability measures on a locally convex Hausdorff real topological linear space E. ...
Abstract. We develop a Radon transform on Banach spaces using Gaussian measure and prove that if a b...
Abstract. Gaussian measure is constructed for any given hyperplane in an infinite-dimensional Hilber...
The classical Radon transform can be thought of as a way to obtain the density of an n-dimensional o...
Abstract. We study the Gaussian Radon transform in the classical Wiener space of Brownian motion. We...
Gaussian measure is constructed for any given hyperplane in an infinite dimensional Hilbert space, a...
AbstractLet μ and μ1 be probability measures on a locally convex Hausdorff real topological linear s...
Abstract. Let E be a separable real Banach space not containing an isomor-phic copy of c0. Let Q be ...
Abstract. There has been growing recent interest in probabilistic interpretations of kernel-based me...
In this work we extend the finite dimensional Radon transform [23] to the Gaussian measure. We devel...
Abstract. Consider a finite complex Radon measure µ in the plane whose Cauchy transform vanishes µ-a...
AbstractLet μ and μ1 be probability measures on a locally convex Hausdorff real topological linear s...
AbstractThe main purpose of this paper is threefold: Firstly, the topological support of Gaussian me...
Since the 60's $\gamma$-radonifying operators have been used in connection to Gaussian measures on B...
Let μ and μ1 be probability measures on a locally convex Hausdorff real topological linear space E. ...
Let μ and μ1 be probability measures on a locally convex Hausdorff real topological linear space E. ...
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