The colored Jones polynomial and Kontsevich-Zagier series for double twist knots, II
Abstract
Let K(m,p) denote the family of double twist knots where 2m-1 and 2p are non-zero integers denoting the number of half-twists in each region. Using a result of Takata, we prove a formula for the colored Jones polynomial of K(-m,-p) and K(-m,p). The latter case leads to new families of q-hypergeometric series generalizing the Kontsevich-Zagier series. We also use Bailey pairs and formulas of Walsh to find cyclotomic-like expansions for the colored Jones polynomials of K(m,p) and K(m,-p).
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