# How to integrate this function involving Meijer G and Exponential?

I am stuck in solving this integral:

$$\int_0^{\infty} e^{-s\gamma}\cdot\gamma^{-1}\cdot G^{2,0}_{0,2}[\frac{\alpha^2\gamma}{\eta^2\bar{\gamma}}|\frac{-}{\alpha,\alpha}]d\gamma$$

Any help in this regard is highly appreciated.

• $\int_0^{\infty } \tau ^{\alpha -1} e^{-\sigma \tau } \text{MeijerG}\left[\left\{\left\{a_1,\ldots ,a_n\right\},\left\{a_{n+1},\ldots ,a_p\right\}\right\},\left\{\left\{b_1,\ldots,b_m\right\},\left\{b_{m+1},\ldots ,b_q\right\}\right\},\omega \tau ^{l/k}\right] \, d\tau$ see [ Mathematical Functions Site](functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/07/…) – stocha Mar 22 at 7:57