On Ramanujan's q-Continued Fractions of Order Thirty-Four and Sixty-Eight

Abstract

We derived q-continued fractions Xi(q) of order thirty-four and continued fractions Yi(q) of order sixty-eight from a general continued fraction identity of Ramanujan, where i=1,2,3,4,5,6,7 and 8. We established some theta-function identities, and one has been proved for the continued fractions Xi(q) and Yi(q). Furthermore, we obtained results on vanishing coefficients arising from these continued fractions and their reciprocals. As an application of the theta-function identities for Yi(q), we derived certain color partition identities.