Proofs of two q-congruence conjectures of Guo

Abstract

We prove two conjectural q-congruences proposed by Guo. The first is Conjecture 7.2 in Guo's work on q-analogues of two ``divergent'' Ramanujan-type supercongruences; it asserts a square-cyclotomic congruence for a truncated q-analogue of a Ramanujan-type sum when n14. The second is Conjecture 4.1 in Guo's extension of Van Hamme's (A.2) supercongruence; it gives divisibility modulo [n] for a family of truncated basic hypergeometric sums with a parameter s. The proof of the first result relies on a known Watson-transformation congruence obtained by Guo. The proof of the second result is based on period decomposition at primitive roots of unity and a reflection cancellation inside residue blocks.