$q$-Analogues of $\pi$-Related Formulae from Jackson's $_8\phi_7$-Series via Inversion Approach

TL;DR

This paper develops new $q$-series identities related to $ au$-analogues of Ramanujan-like series for $rac{1}{ ext{pi}}$, using inversion techniques on Jackson's $_8 ext{phi}_7$-series, revealing classical limits and convergence rates.

Contribution

It introduces dual theorems and identities for $_8 ext{phi}_7$-series via inversion, leading to novel $q$-series and classical $ au$-analogues of Ramanujan-like series for $rac{1}{ ext{pi}}$.

Findings

Derived dual theorems for $_8 ext{phi}_7$-series.

Established 20 new $q$-series identities.

Connected $q$-series limits to classical $ au$-analogues of Ramanujan-like series.

Abstract

By making use of the multiplicate form of the extended Carlitz inverse series relations, we establish two general `dual' theorems of Jackson's summation formula for well--poised $_8\phi_7$-series. Their duplicate forms under the partition pattern $n=\lfloor{\frac{n}2}\rfloor+\lfloor{\frac{n+1}2}\rfloor$ are explored and yield numerous $q$-series identities whose limiting cases as $q\to1$ result in classical $\pi$-related Ramanujan--like series of convergence rate ``$\frac1{16}$" including one for $1/\pi^2$ discovered by Guillera (2003). The triplicate dual formulae under the partition pattern $n=\lfloor{\frac{n}3}\rfloor+\lfloor{\frac{n+1}3}\rfloor+\lfloor{\frac{n+2}3}\rfloor$ are examined via the ``reverse bisection method", which leads us to twenty new $q$-series identities together with their classical counterparts of convergence rate ``$\frac{-1}{27}$" when $q\to1$.