"Linking number"의 두 판 사이의 차이
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imported>Pythagoras0 (새 문서: ==linking number and HOMFLY polynomial== * Let $L$ be a link. * $P_L$ denote the HOMFLY polynomial * recall that $P_L(a,z)\in \mathbb[a^{\pm 1}, z^{\pm 1}]$ satisfies the skein relat...) |
imported>Pythagoras0 |
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$Q_L(q)$ is a polynomial in $q$ and $Q_L(q)=\sum c_i(L)q^i$ | $Q_L(q)$ is a polynomial in $q$ and $Q_L(q)=\sum c_i(L)q^i$ | ||
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| + | ==related items== | ||
| + | * [[HOMFLY polynomial]] | ||
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| + | ==expositions== | ||
| + | * [http://www.math.buffalo.edu/~asikora/Papers/lk.pdf Sikora, Note on the Homfly-pt polynomial and linking numbers] | ||
2017년 5월 23일 (화) 21:59 판
linking number and HOMFLY polynomial
- Let $L$ be a link.
- $P_L$ denote the HOMFLY polynomial
- recall that $P_L(a,z)\in \mathbb[a^{\pm 1}, z^{\pm 1}]$ satisfies the skein relation
\[ aP_{L_{+}} - a^{-1}P_{L_{-}}=zP_{L_0} \] and $$ P_{n-unlink}=\left(\frac{a-a^{-1}}{z}\right)^{n-1} $$
- thm (Sikora)
For any link $L$ of $n$ components the limit $$ Q_L(q) : = \lim_{v\to 1} \left(\frac{q}{a-a^{-1}}\right)^{\frac{n-1}{2}}P_L(a,\sqrt{q(a-a^{-1})}) $$ exists.
$Q_L(q)$ is a polynomial in $q$ and $Q_L(q)=\sum c_i(L)q^i$