A method for the construction of the originals of certain transforms by means of a generalized Ehfros theorem (Q1086776)

Let us indicate the Laplace transform \(F(s)=\int^{\infty}_{0}e^{- st}f(t)dt\) briefly as f(t)\(\to F(s)\). One can then see that f(t)\(\to F(s)\), \(\phi (t,x)\to \phi (s)e^{-xq(s)}\) implies \(\int^{\infty}_{0}f(x)\phi (t,x)dx\to \phi (s)F(q(s))\) and the authors employ this result (the Ehfros theorem) to derive the original functions for the Laplace transforms \(\vartheta_ 1(s)=s^{-1}\exp (- (1+as)\xi)\exp (\xi /q(s)),\vartheta_ 2(s)=\vartheta_ 1(s)/q(s)\), where \(q(s)=s+b\sqrt{s}+1\).