Add to ORKGThis thesis presents a method for computing symbolic solutions of a certain class of improper integrals related to convolutions of Mellin transforms. Important integrals that fall into this category are integral transforms such as the Fourier, Laplace, and Hankel transforms. The method originated in a presentation by Salvy, However, many of the details of the method were absent. We present the method of Salvy in full which computes a linear homogeneous differentail equation which is satisfied by the integral in question. A theory of contour integrals is introduced that is related to the contour definition of Meijer G functions. This theory is used to prove the correctness of the method of Salvy and also gives a way to compute regions of val...
AbstractIn this note we give a procedure for inverting the integral transform f(x) = ∫0∞ k(xt) φ(t) ...
AbstractIn the present note the authors consider the convolution integral equation ∫0x(x−t)Q−1Hm,np,...
AbstractWe consider the integral equation p(t) = ∫0tK(t−τ)p(τ)dτ+r(t) where both K(t) and r(t) behav...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
AbstractA new class of convolution integral equations whose kernels involve an H-function of several...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
This paper considers two nite integral transforms of Fourier-type, in view to propose a set of eigh...
AbstractWe consider the integral equation p(t) = ∫0tK(t−τ)p(τ)dτ+r(t) where both K(t) and r(t) behav...
AbstractExplicit expressions are derived for the error terms associated with the asymptotic expansio...
In this thesis, we will be examining different classes of discrete and integral transforms. We start...
In this paper we establish some new approach to constructing convolution for general Mellin type tra...
AbstractIn this note we give a procedure for inverting the integral transform f(x) = ∫0∞ k(xt) φ(t) ...
AbstractIn the present note the authors consider the convolution integral equation ∫0x(x−t)Q−1Hm,np,...
AbstractWe consider the integral equation p(t) = ∫0tK(t−τ)p(τ)dτ+r(t) where both K(t) and r(t) behav...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
AbstractA new class of convolution integral equations whose kernels involve an H-function of several...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
The object of this is to evaluate contour integrals for G-function of two variables. Some results fo...
This paper considers two nite integral transforms of Fourier-type, in view to propose a set of eigh...
AbstractWe consider the integral equation p(t) = ∫0tK(t−τ)p(τ)dτ+r(t) where both K(t) and r(t) behav...
AbstractExplicit expressions are derived for the error terms associated with the asymptotic expansio...
In this thesis, we will be examining different classes of discrete and integral transforms. We start...
In this paper we establish some new approach to constructing convolution for general Mellin type tra...
AbstractIn this note we give a procedure for inverting the integral transform f(x) = ∫0∞ k(xt) φ(t) ...
AbstractIn the present note the authors consider the convolution integral equation ∫0x(x−t)Q−1Hm,np,...
AbstractWe consider the integral equation p(t) = ∫0tK(t−τ)p(τ)dτ+r(t) where both K(t) and r(t) behav...
