Eigenvalue hypothesis for multi-strand braids
Abstract
Computing polynomial form of the colored HOMFLY-PT for non-arborescent knots obtained from three or more strand braids is still an open problem. One of the efficient methods suggested for the three-strand braids relies on the eigenvalue hypothesis which uses the Yang-Baxter equation to express the answer through the eigenvalues of the -matrix. In this paper, we generalize the hypothesis to higher number of strands in the braid where commuting relations of non-neighbouring matrices are also incorporated. By solving these equations, we determine the explicit form for -matrices and the inclusive Racah matrices in terms of braiding eigenvalues (for matrices of size up to 6 by 6). For comparison, we briefly discuss the highest weight method for four-strand braids carrying fundamental and symmetric rank two representation. Specifically, we present all the inclusive Racah matrices for representation and compare with the matrices obtained from eigenvalue hypothesis.
Keywords
Cite
@article{arxiv.1711.10952,
title = {Eigenvalue hypothesis for multi-strand braids},
author = {Saswati Dhara and A. Mironov and A. Morozov and An. Morozov and P. Ramadevi and Vivek Kumar Singh and A. Sleptsov},
journal= {arXiv preprint arXiv:1711.10952},
year = {2018}
}
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23 pages