Newton diagram of positivity for ${}_1F_2$ generalized hypergeometric functions

“…To investigate the sign of 1 F 2 generalized hypergeometric function Φ, we shall make use of the following general criterion recently established by the authors [5], which will be applied subsequently in other occasions as well.…”

An extension of positivity for integrals of Bessel functions and Buhmann’s radial basis functions

“…To investigate the sign of 1 F 2 generalized hypergeometric function Φ, we shall make use of the following general criterion recently established by the authors [5], which will be applied subsequently in other occasions as well.…”

An extension of positivity for integrals of Bessel functions and Buhmann’s radial basis functions

“…In this section we aim to extend the aforementioned positivity criterion of [8] for the generalized hypergeometric functions of type (1.8).…”

“…with parameters a > 0, b > 0, c > 0. In the recent work [8], to be explained in detail, a positivity criterion for the functions of type (1.8) is established in terms of the Newton diagram associated to {(a + 1/2, 2a), (2a, a + 1/2)}. Due to certain region of parameters left undetermined, however, it turns out that an application of the criterion to (1.7) yields Theorem A immediately but does not cover the missing region T either.…”

“…(Cho and Yun,[8]) For a > 0, b > 0, c > 0, putΦ(x) = 1 F Let P a bethe Newton diagram associated to Λ = a + 1 2 , 2a , 2a, a + 1 O a the set defined in (4.1), (4.2) and N a the complement of P a ∪ O a in R so that the decomposition R 2 + = P a ∪ O a ∪ N a holds. (i) If Φ ≥ 0, then necessarily b > a, c > a, b + c ≥ 3a + If (b, c) ∈ P a , then Φ ≥ 0 and strict positivity holds unless (b, c) ∈ Λ.…”

Rational Extension of the Newton Diagram for the Positivity of $${}_1F_2$$ Hypergeometric Functions and Askey–Szegö Problem

A class of Meijer's G functions and further representations of the generalized hypergeometric functions