The zero stability for the one-row colored $\mathfrak{sl}_3$ Jones polynomial

Abstract: The stability of coefficients of colored ($\mathfrak{sl}2$-) Jones polynomials ${J{K,n}^{\mathfrak{sl}_2}(q)}_n$ was discovered by Dasbach and Lin. This stability is now called the zero-stability of $J_{K,n}^{\mathfrak{sl}_2}(q)$. Armond showed zero stability for a $B$-adequate link by using the linear skein theory based on the Kauffman bracket. In this paper, we prove the zero stability of one-row colored $\mathfrak{sl}{3}$-Jones polynomials ${J{K,n}^{\mathfrak{sl}_3}(q)}_n$ for $B$-adequate links $L$ with anti-parallel twist regions by using the linear skein theory based on Kuperberg's $\mathfrak{sl}_3$-webs. It implies the existence of many $q$-series obtained from a quantum invariant associated with $\mathfrak{sl}_3$.