Application of Laplace Transformation to Evaluation of Integrals

Let [ f m ; m # N] be a sequence of functions from [0, ) to a Banach space E. We give a new and essential condition on f m , which is weaker than the usual ``local Lipschitz continuity'' condition, ensuring that the convergence of f m is equivalent to the convergence of their Laplace transforms. Thi

## Abstract Relaxation times (__T__~1~, __T__~2~, __T__~1ρ~) are usually evaluated from exponential decay data by least‐squares fitting methods. For this procedure, the integrals or amplitudes of signals must be determined, which can be laborious with large data sets. Moreover, the fitting requires

In this paper the generalized fractional integration operators defined by KIRYAKOVA [6], [7] are expressed in terms of the Laplace transform L and its inverse L -' . These decomposition results are established on L, spaces and some examples are deduced as their special cases.

## 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

In this paper we construct a sequence of regularized inverses of the Laplace transform by relating this transform to a convolution operator for functions on the group of the positive real numbers with multiplication. Estimation of the mixing distribution, when a mixture of exponential distributions