An Inversion Formula for the Distributional Generalised Laplace Transformation

Most methods for the numerical calculation of inverse Laplace transformations f(t) = L -1 [F(s)] have serious limitations concerning the class of functions F(s) that can be inverted or the achievable accuracy. The procedures described in the paper can be used to invert rational as well as irrational

## Abstract In this paper, we study the inversion formula for recovering a function from its windowed Fourier transform. We give a rigorous proof for an inversion formula which is known in engineering. We show that the integral involved in the formula is convergent almost everywhere on \documentcla

## A novel mollifier inversion scheme for the Laplace transform In this article we present a novel inversion method for the Laplace transform for non-equidistant scanning points applying the approximate inverse to this transform. The approximate inverse is a regularization technique for inverse pr

## Abstract Consider the Poincare unit disk model for the hyperbolic plane **H**^2^. Let Ξ be the set of all horocycles in **H**^2^ parametrized by (__θ, p__), where __e^iθ^__ is the point where a horocycle __ξ__ is tangent to the boundary |__z__| = 1, and __p__ is the hyperbolic distance from __ξ_

Suppose that the random vector (X 1 , ..., X q ) follows a Dirichlet distribution on R q + with parameter ( p 1 , ..., p q ) # R q + . For f 1 , ..., f q >0, it is well-known that . In this paper, we generalize this expectation formula to the singular and non-singular multivariate Dirichlet distrib