DLMF:29.8.E9 (Q8713): Difference between revisions

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Changed an Item: Add constraint
Changed an Item: Add constraint
Property / Symbols used
 
Property / Symbols used: Q12364 / rank
 
Normal rank
Property / Symbols used: Q12364 / qualifier
 
Defining formula:

𝐸𝑠 ν m ( z , k 2 ) Lame-Es 𝑚 𝜈 𝑧 superscript 𝑘 2 {\displaystyle{\displaystyle\mathit{Es}^{\NVar{m}}_{\NVar{\nu}}\left(\NVar{z},% \NVar{k^{2}}\right)}}

\LameEs{\NVar{m}}{\NVar{\nu}}@{\NVar{z}}{\NVar{k^{2}}}
Property / Symbols used: Q12364 / qualifier
 
xml-id: C29.S3.SS4.p1.m6aadec

Revision as of 01:24, 2 January 2020

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DLMF:29.8.E9
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    Statements

    𝐸𝑠 ν 2 m + 2 ( z 1 , k 2 ) d w 2 ( z ) / d z | z = K - d w 2 ( z ) / d z | z = - K w 2 ( 0 ) = - k 4 k sn ( z 1 , k ) cn ( z 1 , k ) - K K sn ( z , k ) cn ( z , k ) d 2 𝖯 ν ( y ) d y 2 𝐸𝑠 ν 2 m + 2 ( z , k 2 ) d z . Lame-Es 2 𝑚 2 𝜈 subscript 𝑧 1 superscript 𝑘 2 evaluated-at derivative subscript 𝑤 2 𝑧 𝑧 𝑧 complete-elliptic-integral-first-kind-K 𝑘 evaluated-at derivative subscript 𝑤 2 𝑧 𝑧 𝑧 complete-elliptic-integral-first-kind-K 𝑘 subscript 𝑤 2 0 superscript 𝑘 4 superscript 𝑘 Jacobi-elliptic-sn subscript 𝑧 1 𝑘 Jacobi-elliptic-cn subscript 𝑧 1 𝑘 superscript subscript complete-elliptic-integral-first-kind-K 𝑘 complete-elliptic-integral-first-kind-K 𝑘 Jacobi-elliptic-sn 𝑧 𝑘 Jacobi-elliptic-cn 𝑧 𝑘 derivative shorthand-Ferrers-Legendre-P-first-kind 𝜈 𝑦 𝑦 2 Lame-Es 2 𝑚 2 𝜈 𝑧 superscript 𝑘 2 𝑧 {\displaystyle{\displaystyle\mathit{Es}^{2m+2}_{\nu}\left(z_{1},k^{2}\right)% \frac{\left.\ifrac{\mathrm{d}w_{2}(z)}{\mathrm{d}z}\right|_{z=K}-\left.\ifrac{% \mathrm{d}w_{2}(z)}{\mathrm{d}z}\right|_{z=-K}}{w_{2}(0)}=-\frac{k^{4}}{k^{% \prime}}\operatorname{sn}\left(z_{1},k\right)\operatorname{cn}\left(z_{1},k% \right)\int_{-K}^{K}\operatorname{sn}\left(z,k\right)\operatorname{cn}\left(z,% k\right)\frac{{\mathrm{d}}^{2}\mathsf{P}_{\nu}\left(y\right)}{{\mathrm{d}y}^{2% }}\mathit{Es}^{2m+2}_{\nu}\left(z,k^{2}\right)\mathrm{d}z.}}
    0 references
    DLMF:29.8.E9
    0 references
    cn ( z , k ) Jacobi-elliptic-cn 𝑧 𝑘 {\displaystyle{\displaystyle\operatorname{cn}\left(\NVar{z},\NVar{k}\right)}}
    C22.S2.E5.m2abdec
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    sn ( z , k ) Jacobi-elliptic-sn 𝑧 𝑘 {\displaystyle{\displaystyle\operatorname{sn}\left(\NVar{z},\NVar{k}\right)}}
    C22.S2.E4.m2abdec
    0 references
    𝐸𝑠 ν m ( z , k 2 ) Lame-Es 𝑚 𝜈 𝑧 superscript 𝑘 2 {\displaystyle{\displaystyle\mathit{Es}^{\NVar{m}}_{\NVar{\nu}}\left(\NVar{z},% \NVar{k^{2}}\right)}}
    C29.S3.SS4.p1.m6aadec
    0 references