The one-row colored $\mathfrak{sl}_{3}$ Jones polynomials for pretzel links

Abstract: The colored $\mathfrak{sl}{3}$ Jones polynomial $J{(n_{1}, n_{2})}^{\mathfrak{sl}_{3}}(L;q)$ are given by a link and an $(n_{1}, n_{2})$-irreducible representation of $\mathfrak{sl}{3}$. In general, it is hard to calculate $J{(n_{1}, n_{2})}^{\mathfrak{sl}_{3}}(L;q)$ for an oriented link $L$. However, we calculate the one-row $\mathfrak{sl}{3}$ colored Jones polynomials $J{(n, 0)}^{\mathfrak{sl}_{3}}(P(\alpha,\beta,\gamma);q)$ for three-parameter families of oriented pretzel links $P(\alpha,\beta,\gamma)$ by using Kuperberg's linear skein theory by setting $n_{2}=0$. Furthermore, we show the existence of the tails of $J_{(n, 0)}^{\mathfrak{sl}_{3}}(P(2\alpha +1, 2\beta+1,2\gamma);q)$ for the alternating pretzel knots $P(2\alpha +1, 2\beta+1,2\gamma)$.