On the inverse Laplace transform of H-function associated with Feynman types integrals

Abstract: 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.

“…Proof: Substitute the definition of incomplete H-function 𝛾 , , (𝑧) in the left side of (a) Considering [11] and [12] Γ(𝜏 + 𝑘 + 1) ₚ𝜓 𝑧 (𝑡 , 1), (𝑡 , 1), . .…”

“…Similarly, particular cases for the results from [21] to [28] can be found. Results obtained in [19] and [20] can be reduced to the formulae given in (12) by suitable parameters.…”

“…(iv) Taking 𝑇 = 𝑊 = 1 in [11] and [12], the incomplete Fox-Wright functions convert to the functions ₚ𝛾 and ₚΓ (incomplete generalized hypergeometric) (refer ( 9)):…”

Inverse Laplace Transform of the Incomplete H-Function

“…Proof: Substitute the definition of incomplete H-function 𝛾 , , (𝑧) in the left side of (a) Considering [11] and [12] Γ(𝜏 + 𝑘 + 1) ₚ𝜓 𝑧 (𝑡 , 1), (𝑡 , 1), . .…”

“…Similarly, particular cases for the results from [21] to [28] can be found. Results obtained in [19] and [20] can be reduced to the formulae given in (12) by suitable parameters.…”

“…(iv) Taking 𝑇 = 𝑊 = 1 in [11] and [12], the incomplete Fox-Wright functions convert to the functions ₚ𝛾 and ₚΓ (incomplete generalized hypergeometric) (refer ( 9)):…”

Inverse Laplace Transform of the Incomplete H-Function