We obtain generalizations of Hartley-Hilbert and Fourier-Hilbert transforms on classes of distributions having compact support. Furthermore, we also study extension to certain space of Lebesgue integrable Boehmians. New characterizing theorems are also established in an adequate performance
This article deals with some variants of Krätzel integral operators involving Fox’s H-fun...
This paper investigates the L2 transform on a certain space of generalized functions. Two spaces of ...
ABSTRACT. A class of generalized functions called transformable Boehmians contains a proper subspace...
Abstract. The Hartley transform is first extended to a space of Boehmians where its properties are e...
We introduce some spaces of generalized functions that are defined as generalized quotients and Boeh...
The Radon transform, which enables one to reconstructa function of N variables from the knowledge of...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
The space of integrable Boehmians β`(R) contains a subspace which can be identified with L1(R). The ...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
Abstract. On behalf of the Mellin-type convolution a space of Lebesgue integrable Boehmians is const...
AbstractIn this paper we investigate a Widder potential transform on certain spaces of Boehmians. We...
Abstract In this paper we establish certain spaces of Boehmians for some Meijer type integral transf...
This article deals with some variants of Krätzel integral operators involving Fox’s H-fun...
This article deals with some variants of Krätzel integral operators involving Fox’s H-fun...
This paper investigates the L2 transform on a certain space of generalized functions. Two spaces of ...
ABSTRACT. A class of generalized functions called transformable Boehmians contains a proper subspace...
Abstract. The Hartley transform is first extended to a space of Boehmians where its properties are e...
We introduce some spaces of generalized functions that are defined as generalized quotients and Boeh...
The Radon transform, which enables one to reconstructa function of N variables from the knowledge of...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
The space of integrable Boehmians β`(R) contains a subspace which can be identified with L1(R). The ...
An extension of the Fourier transform which is a one-to-one continuous mapping from the space of tem...
Abstract. On behalf of the Mellin-type convolution a space of Lebesgue integrable Boehmians is const...
AbstractIn this paper we investigate a Widder potential transform on certain spaces of Boehmians. We...
Abstract In this paper we establish certain spaces of Boehmians for some Meijer type integral transf...
This article deals with some variants of Krätzel integral operators involving Fox’s H-fun...
This article deals with some variants of Krätzel integral operators involving Fox’s H-fun...
This paper investigates the L2 transform on a certain space of generalized functions. Two spaces of ...
ABSTRACT. A class of generalized functions called transformable Boehmians contains a proper subspace...
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