Homfly Polynomial Invariants of Torus Knots and Bosonic (q, p)-Calculus

Authors

  • A. M. Pavlyuk Bogolyubov Institute for Theoretical Physics, Nat. Acad. of Sci. of Ukraine

DOI:

https://doi.org/10.15407/ujpe58.12.1178

Keywords:

polynomial invariant, knot, link, Alexander, Jones, and HOMFLY skein relations, “bosonic” q-numbers, “bosonic” (q, p)-numbers

Abstract

For the one-parameter Alexander (Jones) skein relation we introduce the Alexander (Jones) “bosonic” q-numbers, and for the two-parameter HOMFLY skein relation we propose the HOMFLY “bosonic” (q, p)-numbers (“bosonic” numbers connected with deformed bosonic oscillators). With the help of these deformed “bosonic” numbers, the corresponding skein relations can be reproduced. Analyzing the introduced “bosonic” numbers, we point out two ways of obtaining the two-parameter HOMFLY skein relation (“bosonic” (q, p)-numbers) from the one-parameter Alexander and Jones skein relations (from the corresponding “bosonic” q-numbers). These two ways of obtaining the HOMFLY skein relation are equivalent.

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Published

2018-10-11

How to Cite

Pavlyuk, A. M. (2018). Homfly Polynomial Invariants of Torus Knots and Bosonic (q, p)-Calculus. Ukrainian Journal of Physics, 58(12), 1178. https://doi.org/10.15407/ujpe58.12.1178

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Section

General problems of theoretical physics