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本帖最后由 青青子衿 于 2024-12-10 10:34 编辑 \begin{align*}
\sum_{m=-\infty}^{+\infty}\sum_{n=-\infty}^{+\infty}q^{m^{2}+mn+\frac{\ell+1}{4}n^{2}}&=\vartheta _2(0,q) \vartheta _2(0,q^{\ell})+\vartheta _3(0,q) \vartheta _3(0,q^{\ell})\\
&\qquad\qquad\qquad\qquad\qquad\quad\big(\ell=3,7,11\big)\qquad\\
\vartheta _2(0,q)&=2q^{1/4}\prod_{k=1}^{+\infty}\frac{(1-q^{4k})^2}{1-q^{2k}}\\
&=2q^{1/4}\prod\limits_{k=1}^{+\infty\>\>}\left(1-q^{2 k}\right) \left(1+q^{2 k}\right)^2\\
\vartheta _3(0,q)&=\prod_{k=1}^{+\infty}\frac{(1-q^{2k})^5}{(1-q^{k})^2(1-q^{4k})^2}\\
&=\prod\limits_{k=1}^{+\infty\>\>}\left(1-q^{2 k}\right) \left(1+q^{2 k-1}\right)^2\\
\eta(\tau)=\eta\langle\,q\,\rangle&={\mathfrak{q}}^{1/24}\prod\limits_{k=1}^{+\infty\>\>}\left(1-\mathfrak{q}^{k}\right)={q}^{1/12}\prod\limits_{k=1}^{+\infty\>\>}\left(1-q^{2k}\right)
\end{align*}
\begin{align*}
\vartheta_2(0,e^{\pi\,\!i\tau})&=\frac{2\eta^2(2\tau)}{\eta(\tau)}\\
\vartheta_3(0,e^{\pi\,\!i\tau})&=\frac{\eta^5(\tau)}{\eta^2(\frac{\tau}{2})\eta^2(2\tau)}\\
\vartheta_4(0,e^{\pi\,\!i\tau})&=\frac{\eta^2(\frac{\tau}{2})}{\eta(\tau)}\\
\lambda(\tau)&=\dfrac{\vartheta_2^4(0,e^{\pi\,\!i\tau})}{\vartheta_3^4(0,e^{\pi\,\!i\tau})}\\
&=\left(\frac{2\eta^2(\frac{\tau}{2})\eta^4(2\tau)}{\eta^6(\tau)}\right)^4
\end{align*}
- FullSimplify[
- Series[EllipticTheta[3, 0, q] EllipticTheta[3, 0, q^11] +
- EllipticTheta[2, 0, q] EllipticTheta[2, 0, q^11], {q, 0, 20}],
- Assumptions -> q > 0]
- Series[Sum[q^(m^2 + m*n + 3 n^2), {m, -10, 10}, {n, -10, 10}], {q, 0,
- 20}]
kuing.cjhb.site/forum.php?mod=redirect&goto=findpost&ptid=8440&pid=53857
Powers of theta functions
[Heng Huat Chan, Shaun Cooper]
msp.org/pjm/2008/235-1/pjm-v235-n1-p01-p.pdf
The modular curves X0 (11) and X1 (11)
[Tom Weston]
swc-math.github.io/notes/files/01Weston1.pdf
Hypergeometric transformation formulas of degrees 3, 7, 11 and 23
Shaun Cooper, Massey University
Jinqi Ge, Massey University
Dongxi Ye, Sun Yat-Sen University
sciencedirect.com/science/article/pii/S0022247X14007045
【超几何变换】【戴德金伊塔函数】
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