The one-row colored sl3 Jones polynomials for pretzel links

Abstract

The colored sl3 Jones polynomial J(n1, n2)sl3(L;q) are given by a link and an (n1, n2)-irreducible representation of sl3. In general, it is hard to calculate J(n1, n2)sl3(L;q) for an oriented link L. However, we calculate the one-row sl3 colored Jones polynomials J(n, 0)sl3(P(α,β,γ);q) for three-parameter families of oriented pretzel links P(α,β,γ) by using Kuperberg's linear skein theory by setting n2=0. Furthermore, we show the existence of the tails of J(n, 0)sl3(P(2α +1, 2β+1,2γ);q) for the alternating pretzel knots P(2α +1, 2β+1,2γ).