Satellite ruling polynomials, DGA representations, and the colored HOMFLY-PT polynomial

Abstract

We establish relationships between two classes of invariants of Legendrian knots in R3: Representation numbers of the Chekanov-Eliashberg DGA and satellite ruling polynomials. For positive permutation braids, β ⊂ J1S1, we give a precise formula in terms of representation numbers for the m-graded ruling polynomial RmS(K,β)(z) of the satellite of K with β specialized at z=q1/2-q-1/2 with q a prime power, and we use this formula to prove that arbitrary m-graded satellite ruling polynomials, RmS(K,L), are determined by the Chekanov-Eliashberg DGA of K. Conversely, for m≠ 1, we introduce an n-colored m-graded ruling polynomial, Rmn,K(q), in strict analogy with the n-colored HOMFLY-PT polynomial, and show that the total n-dimensional m-graded representation number of K to Fqn, Repm(K,Fqn), is exactly equal to Rmn,K(q). In the case of 2-graded representations, we show that R2n,K=Rep2(K, Fqn) arises as a specialization of the n-colored HOMFLY-PT polynomial.