Legendrian DGA Representations and the Colored Kauffman Polynomial
Abstract
For any Legendrian knot in standard contact we relate counts of ungraded (-graded) representations of the Legendrian contact homology DG-algebra with the -colored Kauffman polynomial. To do this, we introduce an ungraded -colored ruling polynomial, , as a linear combination of reduced ruling polynomials of positive permutation braids and show that (i) arises as a specialization of the -colored Kauffman polynomial and (ii) when is a power of two agrees with the total ungraded representation number, , which is a normalized count of -dimensional representations of over the finite field . This complements results from [Leverson C., Rutherford D., Quantum Topol. 11 (2020), 55-118, arXiv:1802.10531] concerning the colored HOMFLY-PT polynomial, -graded representation numbers, and -graded ruling polynomials with .
Keywords
Cite
@article{arxiv.1908.08978,
title = {Legendrian DGA Representations and the Colored Kauffman Polynomial},
author = {Justin Murray and Dan Rutherford},
journal= {arXiv preprint arXiv:1908.08978},
year = {2020}
}