In this paper, we perform the computation of the Laplace-Stieljes transform of Lognormal and Weibull distribution, in which the upper limit of the definite integral from infinite to 1 by using proper transformation. Some advantages are found in this study
The normal-Laplace (NL) distribution results from convolving independent normally distributed and La...
Let (X-1, . . , X-n) be multivariate normal, with mean vector mu and covariance matrix Sigma, and le...
One of the important problems of stochastic process theory is to define the Laplace transforms for t...
Integral transforms of the lognormal distribution are of great importance in statistics and probabil...
In this review, we will consider two closely related problems associated with the lognormal distribu...
In this paper, the lognormal distribution is studied, and a new series representation is proposed. T...
It is shown that, when expressing arguments in terms of their logarithms, the Laplace transform of a...
In many various practical problems we often deal with computing distribution functions of sums of in...
AbstractA new procedure for the evaluation of definite and infinite integrals which is connected mai...
but the origin of integral transform is Fourier and Laplace transforms. So these two transforms are ...
After some methodological remarks on the theory of Stieltjes transforms, a systematic classification...
Abstract In this paper, we study the irregular growth of an entire function defined by the Laplace-S...
In the present paper the authors introduce the exponential integral transform and the complementary ...
Shows how to use known Laplace transforms to evaluate infinite integrals involving exponentials in p...
In this work we will introduce theorems relating the Riemann-Liouville fractional integral and the W...
The normal-Laplace (NL) distribution results from convolving independent normally distributed and La...
Let (X-1, . . , X-n) be multivariate normal, with mean vector mu and covariance matrix Sigma, and le...
One of the important problems of stochastic process theory is to define the Laplace transforms for t...
Integral transforms of the lognormal distribution are of great importance in statistics and probabil...
In this review, we will consider two closely related problems associated with the lognormal distribu...
In this paper, the lognormal distribution is studied, and a new series representation is proposed. T...
It is shown that, when expressing arguments in terms of their logarithms, the Laplace transform of a...
In many various practical problems we often deal with computing distribution functions of sums of in...
AbstractA new procedure for the evaluation of definite and infinite integrals which is connected mai...
but the origin of integral transform is Fourier and Laplace transforms. So these two transforms are ...
After some methodological remarks on the theory of Stieltjes transforms, a systematic classification...
Abstract In this paper, we study the irregular growth of an entire function defined by the Laplace-S...
In the present paper the authors introduce the exponential integral transform and the complementary ...
Shows how to use known Laplace transforms to evaluate infinite integrals involving exponentials in p...
In this work we will introduce theorems relating the Riemann-Liouville fractional integral and the W...
The normal-Laplace (NL) distribution results from convolving independent normally distributed and La...
Let (X-1, . . , X-n) be multivariate normal, with mean vector mu and covariance matrix Sigma, and le...
One of the important problems of stochastic process theory is to define the Laplace transforms for t...
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