Symplectic quandle Method and $SL(2,\mathbb C)$-representations of 2-bridge Knots

Abstract: In this paper, we extend the symplectic quandle method, previously employed in our study of parabolic representations of knot groups, to investigate the general $SL(2,\mathbb{C})$-representations of 2-bridge `kmot" groups. We introduce ageneralized symplectic quandle structure' corresponding to ($\mathcal{D}_M$, conjugation) for each $M\in\mathbb C\setminus {0,1,-1}$, where $\mathcal{D}_M={A\in SL(2,\mathbb{C})\mid tr(A)= M+M^{-1} }$. By converting the system of conjugation quandle equations to that of generalized symplectic quandle equations, we obtain a simpler expression for the 2-variable Riley polynomial and derive some recursive formulas for Riley polynomials and Alexander polynomials. This approach enables us to effectively compute the A-polynomials, allowing us to obtain numerous previously unknown A-polynomials within minutes using Mathematica.