Recursive computation of Tchebichef moment and its inverse transform

A new technique of inverting Moments and Laplace Transforms is presented, using a finite series of generalized Laguerre polynomials in the variable t = ln(1/x). The method is tested with two different functions, with particular emphasis on the estimation of errors involved. The applications of momen

## Abstract An efficient and robust method of solving Laplace inverse ransform is proposed based on the wavelet theory. The inverse function is expressed as a wavelet expansion with rapid convergence. Several examples are provided to demonstrate the methodology. As an example of application, the pr

This paper describes a new method for numerical inversion of the Laplace transform based on a conformal mapping of the Bromwich path onto a unit circle. The inversion integral along the unit circle in a complex plane, is obtained numerically using the trapezoidal rule. Some numerical results of the

## Abstract We consider the problem of finding __u__ ∈ __L__ ^2^(__I__ ), __I__ = (0, 1), satisfying ∫~__I__~ __u__ (__x__ )__x__ d__x__ = __μ__ ~__k__~ , where __k__ = 0, 1, 2, …, (__α__ ~__k__~ ) is a sequence of distinct real numbers greater than –1/2, and **__μ__** = (__μ__ ~__kl__~ ) is a g