On knots, complements, and 6j-symbols

Abstract

This paper investigates the relation between colored HOMFLY-PT and Kauffman homology, SO(N) quantum 6j-symbols and (a,t)-deformed FK. First, we present a simple rule of grading change which allows us to obtain the [r]-colored quadruply-graded Kauffman homology from the [r2]-colored quadruply-graded HOMFLY-PT homology for thin knots. This rule stems from the isomorphism of the representations (so6,[r]) (sl4,[r2]). Also, we find the relationship among A-polynomials of SO and SU-type coming from a differential on Kauffman homology. Second, we put forward a closed-form expression of SO(N)(N≥ 4) quantum 6j-symbols for symmetric representations, and calculate the corresponding SO(N) fusion matrices for the cases when representations R = [1],[2]. Third, we conjecture closed-form expressions of (a,t)-deformed FK for the complements of double twist knots with positive braids. Using the conjectural expressions, we derive t-deformed ADO polynomials.