HOMFLY polynomial

In the mathematical field of knot theory, the HOMFLY polynomial, sometimes called the HOMFLY-PT polynomial or the generalized Jones polynomial, is a 2-variable knot polynomial, i.e. a knot invariant in the form of a polynomial of variables "m" and "l". It generalizes both the Alexander polynomial and the Jones polynomial both of which can be obtained by appropriate substitutions from HOMFLY.

The name "HOMFLY" combines the initials of its co-discoverers: Hoste, Ocneanu, Millett, Freyd, Lickorish, and Yetter [cite journal|last = Freyd|first = P.|coauthors = Yetter, D., Hoste, J., Lickorish, W.B.R., Millett, K., and Ocneanu, A.|title = A New Polynomial Invariant of Knots and Links|journal = Bulletin of the American Mathematical Society|volume = 12|issue = 2|date = 1985|pages = 239–246|doi = 10.1090/S0273-0979-1985-15361-3] . The addition of "PT" recognizes independent work carried out by Przytycki and Traczyk.

The polynomial is defined using skein relations:

: $P( mathrm{unknot} ) = 1,,$

: $ell P(L_+) + ell^{-1}P(L_-) + mP(L_0)=0,,$

where $L_+, L_-, L_0$ are crossing and smoothing changes on a local region of a link diagram, as indicated in the figure.

The HOMFLY polynomial of a link "L" that is a split union of two links $L_1$ and $L_2$ is given by $P(L) = frac{-(l+l^{-1})}{m} P(L_1)*P(L_2)$ .

See the page on skein relation for an example of a computation using these relations.

Other HOMFLY skein relations

This polynomial can be obtained also using other skein relations:: $alpha P(L_+) - alpha^{-1}P(L_-) = zP(L_0),,$ : $xP(L_+) + yP(L_-) + zP(L_0)=0,,$

Main properties

: $V(t)=P(alpha=t,z=t^{1/2}-t^{-1/2}),,$ where V(t) is the Jones polynomial.

: $Delta(t)=P(alpha=1,z=t^{1/2}-t^{-1/2}),,$ where $Delta(t),$ is the Alexander polynomial.

: $P(L_1 # L_2)=P(L_1)P(L_2),,$ : $P_K(ell,m)=P_{Mirror Image(K)}(ell^{-1},m),,$

References

* Kauffman, L.H., "Formal knot theory", Princeton University Press, 1983.
* Lickorish, W.B.R.. "An Introduction to Knot Theory". Springer. ISBN 038798254X.
* Weisstein, Eric W. "HOMFLY Polynomial." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/HOMFLYPolynomial.html

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