A further q-analogue of Gosper's strange series
Abstract
Recently, the second author [Ramanujan J. 2026] introduced and proved a q-series identity that appears to provide the first known q-analogue of an evaluation for a 2F1-series known as Gosper's strange series. Yamaguchi's derivation of this q-analogue relies on three-term relations for 2φ1-series along with Heine's transformation of 2φ1-series. In this note, we introduce and prove, using a q-analogue of a series evaluation technique relying on an Abel-type summation lemma, a further q-analogue of Gosper's 2F1-identity that is inequivalent to Yamaguchi's q-analogue, and we also apply this technique to construct an alternative and simplified proof of Yamaguchi's q-analogue, together with a 3φ2-series variant of Heine's q-analogue of Gauss's hypergeometric formula, a 6φ5-series variant and two 4φ3-series variants of the q-analogue of Kummer's identity due to Bailey and Daum, along with a q-analogue of a result obtained by Cantarini [Ramanujan J. 2022] via Fourier-Legendre theory and related to Ramanujan's first series for 1π.
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