Name: | $\mathrm{U}(1)\times\mathrm{U}(1)_2$ |
$\mathbb{R}$-dimension: | $6$ |
Description: | $\left\{\begin{bmatrix}A&0&0\\0&\alpha I_2&0\\0&0&\bar\alpha I_2\end{bmatrix}: A\in\mathrm{U}(1)\subseteq\mathrm{SU}(2),\ \alpha\bar\alpha = 1,\ \alpha\in\mathbb{C}\right\}$ |
Symplectic form: | $\begin{bmatrix}J_2&0&0\\0&0&I_2\\0&-I_2&0\end{bmatrix},\ J_2:=\begin{bmatrix}0&1\\-1&0\end{bmatrix}$ |
Hodge circle: | $u\mapsto\mathrm{diag}(u,\bar u, u, u,\bar u, \bar u)$ |
Name: | $C_2\times C_6$ |
Order: | $12$ |
Abelian: | yes |
Generators: | $\begin{bmatrix}1 & 0 & 0 & 0 & 0 & 0 \\0 & 1 & 0 & 0 & 0 & 0 \\0 & 0 & \zeta_{12}^{1} & 0 & 0 & 0 \\0 & 0 & 0 & \zeta_{12}^{11} & 0 & 0 \\0 & 0 & 0 & 0& \zeta_{12}^{11} & 0 \\0 & 0 & 0 & 0 & 0 & \zeta_{12}^{1} \\\end{bmatrix}, \begin{bmatrix}1 & 0 & 0 & 0 & 0 & 0 \\0 & 1 & 0 & 0 & 0 & 0 \\0 & 0 & 0 & 0 & 0 & 1 \\0 & 0 & 0 & 0 & -1 & 0 \\0 & 0 & 0 & -1 & 0 & 0 \\0 & 0 & 1 & 0 & 0 & 0 \\\end{bmatrix}$ |
$x$ |
$\mathrm{E}[x^{0}]$ |
$\mathrm{E}[x^{1}]$ |
$\mathrm{E}[x^{2}]$ |
$\mathrm{E}[x^{3}]$ |
$\mathrm{E}[x^{4}]$ |
$\mathrm{E}[x^{5}]$ |
$\mathrm{E}[x^{6}]$ |
$\mathrm{E}[x^{7}]$ |
$\mathrm{E}[x^{8}]$ |
$\mathrm{E}[x^{9}]$ |
$\mathrm{E}[x^{10}]$ |
$\mathrm{E}[x^{11}]$ |
$\mathrm{E}[x^{12}]$ |
$a_1$ |
$1$ |
$0$ |
$4$ |
$0$ |
$48$ |
$0$ |
$940$ |
$0$ |
$22400$ |
$0$ |
$586404$ |
$0$ |
$16249464$ |
$a_2$ |
$1$ |
$2$ |
$12$ |
$95$ |
$932$ |
$10137$ |
$117137$ |
$1408570$ |
$17435292$ |
$220694897$ |
$2844378047$ |
$37212813420$ |
$493094031261$ |
$a_3$ |
$1$ |
$0$ |
$18$ |
$0$ |
$2478$ |
$0$ |
$554800$ |
$0$ |
$146799310$ |
$0$ |
$42636243888$ |
$0$ |
$13184713002384$ |
$\left(\mathrm{E}\left[a_1^{e_1}a_2^{e_2}a_3^{e_3}\right]:\sum ie_i=2\right)\colon$ |
$2$ |
$4$ |
$\left(\mathrm{E}\left[a_1^{e_1}a_2^{e_2}a_3^{e_3}\right]:\sum ie_i=4\right)\colon$ |
$12$ |
$6$ |
$22$ |
$48$ |
$\left(\mathrm{E}\left[a_1^{e_1}a_2^{e_2}a_3^{e_3}\right]:\sum ie_i=6\right)\colon$ |
$18$ |
$95$ |
$56$ |
$198$ |
$114$ |
$426$ |
$940$ |
$\left(\mathrm{E}\left[a_1^{e_1}a_2^{e_2}a_3^{e_3}\right]:\sum ie_i=8\right)\colon$ |
$146$ |
$932$ |
$538$ |
$318$ |
$2032$ |
$1176$ |
$4494$ |
$2580$ |
$10000$ |
$22400$ |
$\left(\mathrm{E}\left[a_1^{e_1}a_2^{e_2}a_3^{e_3}\right]:\sum ie_i=10\right)\colon$ |
$1508$ |
$10137$ |
$864$ |
$5790$ |
$3318$ |
$22618$ |
$12894$ |
$7388$ |
$50772$ |
$28880$ |
$114420$ |
$64890$ |
$258650$ |
$586404$ |
$\left(\mathrm{E}\left[a_1^{e_1}a_2^{e_2}a_3^{e_3}\right]:\sum ie_i=12\right)\colon$ |
$2478$ |
$16760$ |
$117137$ |
$9558$ |
$66254$ |
$37572$ |
$264782$ |
$21336$ |
$149490$ |
$84572$ |
$600516$ |
$338380$ |
$191110$ |
$1365420$ |
$$ |
$768040$ |
$3111472$ |
$1747116$ |
$7104132$ |
$16249464$ |
$\mathrm{E}\left[\chi_i\chi_j\right] = \begin{bmatrix}1&0&1&0&2&0&1&4&0&3&0&4&0&0&8\\0&4&0&2&0&12&0&0&16&0&10&0&18&34&0\\1&0&9&0&8&0&23&23&0&14&0&45&0&0&88\\0&2&0&10&0&20&0&0&24&0&10&0&52&58&0\\2&0&8&0&16&0&24&35&0&29&0&61&0&0&120\\0&12&0&20&0&76&0&0&108&0&56&0&168&248&0\\1&0&23&0&24&0&83&79&0&54&0&163&0&0&344\\4&0&23&0&35&0&79&108&0&85&0&187&0&0&408\\0&16&0&24&0&108&0&0&176&0&84&0&252&396&0\\3&0&14&0&29&0&54&85&0&81&0&142&0&0&328\\0&10&0&10&0&56&0&0&84&0&50&0&118&196&0\\4&0&45&0&61&0&163&187&0&142&0&372&0&0&792\\0&18&0&52&0&168&0&0&252&0&118&0&448&612&0\\0&34&0&58&0&248&0&0&396&0&196&0&612&948&0\\8&0&88&0&120&0&344&408&0&328&0&792&0&0&1800\end{bmatrix}$
$\ \ \ \mathrm{E}\left[\chi_i^2\right] = \begin{bmatrix}1&4&9&10&16&76&83&108&176&81&50&372&448&948&1800&870&859&2024&1635&492\end{bmatrix}$
| $-$ | $a_2\in\mathbb{Z}$ | $a_2=-1$ | $a_2=0$ | $a_2=1$ | $a_2=2$ | $a_2=3$ |
---|
$-$ | $1$ | $1/2$ | $1/12$ | $1/6$ | $0$ | $1/6$ | $1/12$ |
---|
$a_1=0$ | $0$ | $0$ | $0$ | $0$ | $0$ | $0$ | $0$ |
---|
$a_3=0$ | $0$ | $0$ | $0$ | $0$ | $0$ | $0$ | $0$ |
---|
$a_1=a_3=0$ | $0$ | $0$ | $0$ | $0$ | $0$ | $0$ | $0$ |
---|