James Mc Laughlin, Peter Zimmer
Published 2019-01-05Version 1
Motivated by a recent paper of Liu and Ma, we describe a number of general WP-Bailey chains. We show that many of the existing WP-Bailey chains (or branches of the WP-Bailey tree), including chains found by Andrews, Warnaar and Liu and Ma, arise as special cases of these general WP-Bailey chains. We exhibit three new branches of the WP-Bailey tree, branches which also follow as special cases of these general WP-Bailey chains. Finally, we describe a number of new transformation formulae for basic hypergeometric series which arise as consequences of these new WP-Bailey chains.
Comments: 20 pages
Journal: The Ramanujan Journal 22 (2010), no. 1, 11-31
Some Implications of the WP-Bailey Tree
Cyclotomic valuation of $q$-Pochhammer symbols and $q$-integrality of basic hypergeometric series
Some $q$-supercongruences from transformation formulas for basic hypergeometric series
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