Fox H-function

Template:Short description Template:Redirect-distinguish In mathematics, the Fox H-function H(x) is a generalization of the Meijer G-function and the Fox–Wright function introduced by Template:Harvs. It is defined by a Mellin–Barnes integral

${\displaystyle H_{p,q}^{m,n}\left[z|\begin{array}{cccc}(a_1,A_1)& (a_2,A_2)& \dots & (a_p,A_p)\\ (b_1,B_1)& (b_2,B_2)& \dots & (b_q,B_q)\end{array}\right]=\frac{1}{2\pi i}\underset{L}{\int }\frac{{\displaystyle \prod _{j=1}^m}\mathrm{\Gamma }(b_j+B_{j}s){\displaystyle \prod _{j=1}^n}\mathrm{\Gamma }(1-a_j-A_{j}s)}{{\displaystyle \prod _{j=m+1}^q}\mathrm{\Gamma }(1-b_j-B_{j}s){\displaystyle \prod _{j=n+1}^p}\mathrm{\Gamma }(a_j+A_{j}s)}{z}^{-s}ds,}$

where L is a certain contour separating the poles of the two factors in the numerator.

A relation of the Fox H-Function to the -1 branch of the Lambert W-function is given by

${\displaystyle \overline{{\mathrm{W}}_{-1}(-\alpha \cdot z)}=\{\begin{array}{c}\underset{\beta \to {\alpha }^{-}}{\lim }[\frac{{\alpha }^2\cdot {((\alpha -\beta )\cdot z)}^{\frac{\alpha }{\beta }}}{\beta }\cdot {\mathrm{H}}_{1,2}^{1,1}(\begin{array}{c}(\frac{\alpha +\beta }{\beta },\frac{\alpha }{\beta })\\ (0,1),(-\frac{\alpha }{\beta },\frac{\alpha -\beta }{\beta })\end{array}\mid -{((\alpha -\beta )\cdot z)}^{\frac{\alpha }{\beta }-1})],\text{for}\left|z\right|<\frac{1}{e\left|\alpha \right|}\\ \underset{\beta \to {\alpha }^{-}}{\lim }[\frac{{\alpha }^2\cdot {((\alpha -\beta )\cdot z)}^{-\frac{\alpha }{\beta }}}{\beta }\cdot {\mathrm{H}}_{2,1}^{1,1}(\begin{array}{c}(1,1),(\frac{\beta -\alpha }{\beta },\frac{\alpha -\beta }{\beta })\\ (-\frac{\alpha }{\beta },\frac{\alpha }{\beta })\end{array}\mid -{((\alpha -\beta )\cdot z)}^{1-\frac{\alpha }{\beta }})],\text{otherwise}\end{array}}$where ${\displaystyle \bar{z}}$ is the complex conjugate of ${\displaystyle z}$.^[1]

Compare to the Meijer G-function

${\displaystyle G_{p,q}^{m,n}\left(\begin{array}{c}{a}_1,\dots ,a_p\\ b_1,\dots ,b_q\end{array}|z\right)=\frac{1}{2\pi i}\underset{L}{\int }\frac{{\displaystyle \prod _{j=1}^m}\mathrm{\Gamma }(b_j-s){\displaystyle \prod _{j=1}^n}\mathrm{\Gamma }(1-a_j+s)}{{\displaystyle \prod _{j=m+1}^q}\mathrm{\Gamma }(1-b_j+s){\displaystyle \prod _{j=n+1}^p}\mathrm{\Gamma }(a_j-s)}{z}^{s}ds.}$

The special case for which the Fox H reduces to the Meijer G is A_j = B_k = C, C > 0 for j = 1...p and k = 1...q :^[2]

${\displaystyle H_{p,q}^{m,n}\left[z|\begin{array}{cccc}(a_1,C)& (a_2,C)& \dots & (a_p,C)\\ (b_1,C)& (b_2,C)& \dots & (b_q,C)\end{array}\right]=\frac{1}{C}{G}_{p,q}^{m,n}\left(\begin{array}{c}{a}_1,\dots ,a_p\\ b_1,\dots ,b_q\end{array}|z^{1/C}\right).}$

A generalization of the Fox H-function was given by Ram Kishore Saxena.^[3][4] A further generalization of this function, useful in physics and statistics, was provided by A.M. Mathai and Ram Kishore Saxena.^[5][6]

Template:Reflist

• Template:Citation
• Template:Citation
• Template:Citation
• Template:Citation

• Template:Citation
• Template:Citation
• Template:Citation.
• Template:Citation
• Template:Cite book

• hypergeom on GitLab
• Use in solving ${\displaystyle x+x^a=y}$ on MathOverflow