数字8结的彩色琼斯多项式和量子模性

Pub Date : 2022-09-16 DOI:10.4153/s0008414x23000172

H. Murakami

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引用次数: 2

摘要

我们研究了在$\exp\bigl((u+2p\pi\i)/N\bigr)$处求值的8字形结的$N$维彩色Jones多项式的渐近行为，其中$u$是一个小实数，$p$是一个正整数。我们证明了它是渐近等价于$p$维彩色琼斯多项式在$\exp\bigl(4N\pi^2/(u+2p\pi\i)\bigr)$处的值与一个由Chern—Simons不变量决定的增长率指数增长的项的乘积。这表明了有色琼斯多项式的量子模性。

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THE COLORED JONES POLYNOMIAL OF THE FIGURE-EIGHT KNOT AND A QUANTUM MODULARITY

We study the asymptotic behavior of the $N$-dimensional colored Jones polynomial of the figure-eight knot evaluated at $\exp\bigl((u+2p\pi\i)/N\bigr)$, where $u$ is a small real number and $p$ is a positive integer. We show that it is asymptotically equivalent to the product of the $p$-dimensional colored Jones polynomial evaluated at $\exp\bigl(4N\pi^2/(u+2p\pi\i)\bigr)$ and a term that grows exponentially with growth rate determined by the Chern--Simons invariant. This indicates a quantum modularity of the colored Jones polynomial.

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