Transformation and reduction formulae for double \(q\)-Clausen series of type \(\Phi_{1:1;\mu}^{1:2;\lambda}\) (Q864717)

The generalized bivariate basic hypergeometric series of the form \(\Phi_{\mu:u;v}^{\lambda:r;s}\) is the \(q\)-analogue of Kampé de Fériet function. In this paper the authors study a \(q\)-Clausen type hypergeometric series \(\Phi_{1:1;\mu}^{1:2;\lambda}\) by employing the Sears transformations. Several general transformations for non-terminating, semi-terminating and terminating series \(\Phi_{1:1;\mu}^{1:2;\lambda}\) are established, some of which are closely related to other types of \(q\)-Clausen functions. Furthermore the authors derive several reduction and summation formulae for \(\Phi_{1:1;1}^{1:2;2}\) \(\Phi_{1:1;2}^{1:2;3}\) and \(\Phi_{1:1;3}^{1:2;4}\) as consequences.