Inverse Laplace transformIn mathematics, the inverse Laplace transform of a function is a real function that is piecewise-continuous, exponentially-restricted (that is, for some constants and ) and has the property: where denotes the Laplace transform. It can be proven that, if a function has the inverse Laplace transform , then is uniquely determined (considering functions which differ from each other only on a point set having Lebesgue measure zero as the same). This result was first proven by Mathias Lerch in 1903 and is known as Lerch's theorem.[1][2] The Laplace transform and the inverse Laplace transform together have a number of properties that make them useful for analysing linear dynamical systems. Mellin's inverse formulaAn integral formula for the inverse Laplace transform, called the Mellin's inverse formula, the Bromwich integral, or the Fourier–Mellin integral, is given by the line integral: where the integration is done along the vertical line in the complex plane such that is greater than the real part of all singularities of and is bounded on the line, for example if the contour path is in the region of convergence. If all singularities are in the left half-plane, or is an entire function, then can be set to zero and the above inverse integral formula becomes identical to the inverse Fourier transform. In practice, computing the complex integral can be done by using the Cauchy residue theorem. Post's inversion formulaPost's inversion formula for Laplace transforms, named after Emil Post,[3] is a simple-looking but usually impractical formula for evaluating an inverse Laplace transform. The statement of the formula is as follows: Let be a continuous function on the interval of exponential order, i.e. for some real number . Then for all , the Laplace transform for exists and is infinitely differentiable with respect to . Furthermore, if is the Laplace transform of , then the inverse Laplace transform of is given by for , where is the -th derivative of with respect to . As can be seen from the formula, the need to evaluate derivatives of arbitrarily high orders renders this formula impractical for most purposes. With the advent of powerful personal computers, the main efforts to use this formula have come from dealing with approximations or asymptotic analysis of the Inverse Laplace transform, using the Grunwald–Letnikov differintegral to evaluate the derivatives. Post's inversion has attracted interest due to the improvement in computational science and the fact that it is not necessary to know where the poles of lie, which make it possible to calculate the asymptotic behaviour for big using inverse Mellin transforms for several arithmetical functions related to the Riemann hypothesis. Software tools
See alsoReferences
Further reading
External links
This article incorporates material from Mellin's inverse formula on PlanetMath, which is licensed under the Creative Commons Attribution/Share-Alike License. |