Triplicate Dual Series of Dougall–Dixon Theorem

04/04/2021

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Applying the triplicate form of the extended Gould–Hsu inverse series relations to Dougall's summation theorem for the well–poised _7F_6-series, we establish, from the dual series, several interesting Ramanujan–like infinite series expressions for π^2 and π^±1 with convergence rate "-1/27".

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Triplicate Dual Series of Dougall–Dixon Theorem

Direct and inverse results for Kantorovich type exponential sampling series

Hadamard matrices related to a certain series of ternary self-dual codes

Born and inverse Born series for scattering problems with Kerr nonlinearities

Translation of "Simplizialzerlegungen von Beschrankter Flachheit” by Hans Freudenthal, Annals of Mathematics, Second Series, Volume 43, Number 3, July 1942, Pages 580-583

On the speed of uniform convergence in Mercer's theorem

Strengthening of the Assmus–Mattson theorem for some dual codes

Discovering and Proving Infinite Pochhammer Sum Identities

Triplicate Dual Series of Dougall–Dixon Theorem

Related Research

Direct and inverse results for Kantorovich type exponential sampling series

Hadamard matrices related to a certain series of ternary self-dual codes

Born and inverse Born series for scattering problems with Kerr nonlinearities

Translation of "Simplizialzerlegungen von Beschrankter Flachheit” by Hans Freudenthal, Annals of Mathematics, Second Series, Volume 43, Number 3, July 1942, Pages 580-583

On the speed of uniform convergence in Mercer's theorem

Strengthening of the Assmus–Mattson theorem for some dual codes

Discovering and Proving Infinite Pochhammer Sum Identities