Difference between revisions of "Q-theta function"

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(Created page with "For $0 \leq |q| < 1$, $$\theta(z;q)=\prod_{k=0}^{\infty} (1-q^kz) \left(1-\dfrac{q^{k+1}}{z} \right)=(z;q)_{\infty}(\frac{q}{z};q)_{\infty},$$ where $(a,b)_{\infty}$ is the...")
 
 
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For $0 \leq |q|  < 1$,  
 
For $0 \leq |q|  < 1$,  
$$\theta(z;q)=\prod_{k=0}^{\infty} (1-q^kz) \left(1-\dfrac{q^{k+1}}{z} \right)=(z;q)_{\infty}(\frac{q}{z};q)_{\infty},$$
+
$$\theta(z;q)=\prod_{k=0}^{\infty} (1-q^kz) \left(1-\dfrac{q^{k+1}}{z} \right)=(z;q)_{\infty}\left(\frac{q}{z};q \right)_{\infty},$$
 
where $(a,b)_{\infty}$ is the [[q-Pochhammer symbol | $q$-Pochhammer symbol]].
 
where $(a,b)_{\infty}$ is the [[q-Pochhammer symbol | $q$-Pochhammer symbol]].

Latest revision as of 00:56, 19 October 2014

For $0 \leq |q| < 1$, $$\theta(z;q)=\prod_{k=0}^{\infty} (1-q^kz) \left(1-\dfrac{q^{k+1}}{z} \right)=(z;q)_{\infty}\left(\frac{q}{z};q \right)_{\infty},$$ where $(a,b)_{\infty}$ is the $q$-Pochhammer symbol.

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