Open AccessOn the inverse Laplace transform of H-function associated with Feynman types integrals
Author(s) -
V. B. L. Chaurasia,
Hari Singh Parihar
Publication year - 2008
Publication title -
tamkang journal of mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.324
H-Index - 18
eISSN - 0049-2930
pISSN - 2073-9826
DOI - 10.5556/j.tkjm.39.2008.8
Subject(s) - laplace transform , inverse laplace transform , mathematics , inverse , laplace transform applied to differential equations , two sided laplace transform , laplace–stieltjes transform , post's inversion formula , mellin transform , green's function for the three variable laplace equation , algebraic number , function (biology) , value (mathematics) , boundary (topology) , mathematical analysis , fourier transform , geometry , fractional fourier transform , statistics , fourier analysis , evolutionary biology , biology
The Laplace transform and its inverse are fundamental and powerful tools in solving boundary value problems occurring in the diverse fields of engineering. Here we will establish some useful formulas giving the inverse Laplace transform of various products of algebraic powers and $ overline{H} $-function, involving one and more variables, which are unified and likely to have applications in several different areas