Add to ORKGIn this thesis, we consider a new generalization of the Fourier transform, depending on four complex parameters and all the powers of the Fourier transform. This new transform is studied in some Lebesgue spaces. In fact, taking into account the values of the parameters of the operator, we can have very different kernels and so, the corresponding operator is studied in different Lebesgue spaces, accordingly with its kernel. We begin with the characterization of each operator by its characteristic polynomial. This characterization serves as a basis for the study of the forthcoming properties. Following this, we present, for each case, the spectrum of the corresponding operator, necessary and sufficient conditions for which the operat...
The main aim of this work is to obtain Paley–Wiener and Wiener’s Tauberian results associated with a...
One of the important questions related to any integral transform on a manifold M or on a homogeneous...
In this paper, using the concept of a generalized Feynman integral, we define a generalized Fourier-...
summary:We deal with several classes of integral transformations of the form $$ \label {generalformu...
summary:We deal with several classes of integral transformations of the form $$ \label {generalformu...
We propose four new convolutions exhibiting convenient factorization properties associated with two ...
This paper introduces general definitions of convolutions without and with weight, obtains four new ...
Recently, there has been an increasing interest in the study of hypercomplex signals and their Fouri...
This paper considers two nite integral transforms of Fourier-type, in view to propose a set of eigh...
We introduce eight new convolutions weighted by multi-dimensional Hermite functions, prove two Young...
The objective of this thesis is to make a theoretical and formal study of the Fourier Transform and ...
Recently, there has been an increasing interest in the study of hypercomplex signals and their Fouri...
We study the solvability of a very general class of integral equations whose kernel depends on four ...
We obtain new convolutions for quadratic-phase Fourier integral operators (which include, as subcase...
summary:We deal with several classes of integral transformations of the form $$ \label {generalformu...
The main aim of this work is to obtain Paley–Wiener and Wiener’s Tauberian results associated with a...
One of the important questions related to any integral transform on a manifold M or on a homogeneous...
In this paper, using the concept of a generalized Feynman integral, we define a generalized Fourier-...
summary:We deal with several classes of integral transformations of the form $$ \label {generalformu...
summary:We deal with several classes of integral transformations of the form $$ \label {generalformu...
We propose four new convolutions exhibiting convenient factorization properties associated with two ...
This paper introduces general definitions of convolutions without and with weight, obtains four new ...
Recently, there has been an increasing interest in the study of hypercomplex signals and their Fouri...
This paper considers two nite integral transforms of Fourier-type, in view to propose a set of eigh...
We introduce eight new convolutions weighted by multi-dimensional Hermite functions, prove two Young...
The objective of this thesis is to make a theoretical and formal study of the Fourier Transform and ...
Recently, there has been an increasing interest in the study of hypercomplex signals and their Fouri...
We study the solvability of a very general class of integral equations whose kernel depends on four ...
We obtain new convolutions for quadratic-phase Fourier integral operators (which include, as subcase...
summary:We deal with several classes of integral transformations of the form $$ \label {generalformu...
The main aim of this work is to obtain Paley–Wiener and Wiener’s Tauberian results associated with a...
One of the important questions related to any integral transform on a manifold M or on a homogeneous...
In this paper, using the concept of a generalized Feynman integral, we define a generalized Fourier-...