On an expansion formula of Liu (2201.09301v3)

Abstract: In this paper, we extend an expansion formula of Liu to multiple basic hypergeometric series over the root system $A_{n}.$ The usefulness of Liu's expansion formula in special functions and number theory has been shown by Liu and many others. We first establish a very general multiple expansion formula over the root system $A_{n}$ and then deduce several $A_{n}$ extensions of Liu's expansion formula. From these multiple formulas, we derive two groups of multiple expansion formulas for infinite products. As applications, we deduce an $A_{n}$ Rogers' $\text{}{6}\phi{5}$ summation, an $A_{n}$ extension of Sylvester's identity, some multiple expansion formulas for $(q){\infty}^{m},\text{\ensuremath{\pi{q}}}$ and $1/\pi_{q}$, two $A_{n}$ extensions of the Rogers-Fine identity, an $A_{n}$ extension of Liu's extension of Rogers' non-terminating ${6}\phi{5}$ summation, an $A_{n}$ extension of a generalization of Fang's identity and an $A_{n}$ extension of Andrews' expansion formula.