Abstract

AbstractUsing a simple classical method we derive bilateral series identities from terminating ones. In particular, we show how to deduce Ramanujan's 1ψ1 summation from the q-Pfaff-Saalschütz summation. Further, we apply the same method to our previous q-Abel-Rothe summation to obtain, for the first time, Abel-Rothe type generalizations of Jacobi's triple product identity. We also give some results for multiple series.Keywordsq-seriesbilateral seriesJacobi's triple product identityRamanujan's 1ψ1 summationq-Rothe summationq-Abel summationMacdonald identities A r series U(n) series

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