DLMF:23.6.E27 (Q7270): Difference between revisions

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Property / Symbols used
 
Property / Symbols used: Jacobian elliptic function / rank
 
Normal rank
Property / Symbols used: Jacobian elliptic function / qualifier
 
Defining formula:

ns ( z , k ) Jacobi-elliptic-ns 𝑧 𝑘 {\displaystyle{\displaystyle\operatorname{ns}\left(\NVar{z},\NVar{k}\right)}}

\Jacobiellnsk@{\NVar{z}}{\NVar{k}}
Property / Symbols used: Jacobian elliptic function / qualifier
 
xml-id: C22.S2.E4.m3aadec

Revision as of 15:51, 2 January 2020

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DLMF:23.6.E27
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    Statements

    Defining formula
    ζ ( z | 𝕃 1 ) - ζ ( z + 2 K | 𝕃 1 ) + ζ ( 2 K | 𝕃 1 ) = ns ( z , k ) , Weierstrass-zeta-on-lattice 𝑧 subscript 𝕃 1 Weierstrass-zeta-on-lattice 𝑧 2 complete-elliptic-integral-first-kind-K 𝑘 subscript 𝕃 1 Weierstrass-zeta-on-lattice 2 complete-elliptic-integral-first-kind-K 𝑘 subscript 𝕃 1 Jacobi-elliptic-ns 𝑧 𝑘 {\displaystyle{\displaystyle\zeta\left(z|\mathbb{L}_{\mspace{1.0mu }1}\right)-% \zeta\left(z+2K|\mathbb{L}_{\mspace{1.0mu }1}\right)+\zeta\left(2K|\mathbb{L}_% {\mspace{1.0mu }1}\right)=\operatorname{ns}\left(z,k\right),}}
    0 references
    DLMF id
    DLMF:23.6.E27
    0 references
    Symbols used
    Jacobian elliptic function
    Defining formula
    ns ( z , k ) Jacobi-elliptic-ns 𝑧 𝑘 {\displaystyle{\displaystyle\operatorname{ns}\left(\NVar{z},\NVar{k}\right)}}
    xml-id
    C22.S2.E4.m3aadec
    0 references
     
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