When does a hypergeometric function p\!Fq belong to the Laguerre--P\'olya class LP+?
Abstract
I show that a hypergeometric function pFq(a1,…,ap;b1,…,bq;\,·\,) with p q belongs to the Laguerre--P\'olya class LP+ for arbitrarily large bp+1,…,bq > 0 if and only if, after a possible reordering, the differences ai - bi are nonnegative integers. This result arises as an easy corollary of the case p=q proven two decades ago by Ki and Kim. I also give explicit examples for the case 1F2.
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