TR-96-07: An Uppoer Bound for a Basic Hypergeometric Series

Carleton University
Technical Report TR-96-07
March 1996

An Uppoer Bound for a Basic Hypergeometric Series

Lefteris M. Kirousis, Evangelos Kranakis, Danny Krizanc

Abstract

We show that if 0 leq x^2 leq q leq 1, then the basic hypergeometric series sum_{k=0}^{n}{n choose k}_q x^k is bounded above by the product prod_{k=0}^{n-1}(1+xq^{k/2}).

TR-96-07.pdf

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