The Newton Polyhedron and positivity of ${}_2F_3$ hypergeometric functions

Yong-Kum Cho, Seok-Young Chung

Published 2021-02-08Version 1

As for the ${}_2F_3$ hypergeometric function of the form \begin{equation*} {}_2F_3\left[\begin{array}{c} a_1, a_2\\ b_1, b_2, b_3\end{array}\biggr| -x^2\right]\qquad(x>0), \end{equation*} where all of parameters are assumed to be positive, we give sufficient conditions on $(b_1, b_2, b_3)$ for its positivity in terms of Newton polyhedra with vertices consisting of permutations of $\,(a_2, a_1+1/2, 2a_1)\,$ or $\,(a_1, a_2+1/2, 2a_2).$ As an application, we obtain an extensive validity region of $(\alpha, \lambda, \mu)$ for the inequality \begin{equation*} \int_0^x (x-t)^{\lambda}\, t^{\mu} J_\alpha(t)\, dt \ge 0\qquad(x>0). \end{equation*}