Formula:KLS:14.08:36

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x = 0 ( 1 - q 2 x a - 2 ) ( a - 2 , ( a b ) - 1 ; q ) x ( 1 - a - 2 ) ( q , b q a - 1 ; q ) x ( b a - 1 ) x q x 2 Q m ( 1 2 ( a q - x + a - 1 q x ) ; a , b ; q - 1 ) Q n ( 1 2 ( a q - x + a - 1 q x ) ; a , b ; q - 1 ) = ( q a - 2 ; q ) ( b a - 1 q ; q ) ( q , ( a b ) - 1 ; q ) n ( a b ) n q - n 2 δ m , n ( a b > 1 , q b < a ) fragments superscript subscript 𝑥 0 1 superscript 𝑞 2 𝑥 superscript 𝑎 2 q-Pochhammer-symbol superscript 𝑎 2 superscript 𝑎 𝑏 1 𝑞 𝑥 1 superscript 𝑎 2 q-Pochhammer-symbol 𝑞 𝑏 𝑞 superscript 𝑎 1 𝑞 𝑥 superscript fragments ( b superscript 𝑎 1 ) 𝑥 superscript 𝑞 superscript 𝑥 2 Al-Salam-Chihara-polynomial-Q 𝑚 1 2 𝑎 superscript 𝑞 𝑥 superscript 𝑎 1 superscript 𝑞 𝑥 𝑎 𝑏 superscript 𝑞 1 Al-Salam-Chihara-polynomial-Q 𝑛 1 2 𝑎 superscript 𝑞 𝑥 superscript 𝑎 1 superscript 𝑞 𝑥 𝑎 𝑏 superscript 𝑞 1 q-Pochhammer-symbol 𝑞 superscript 𝑎 2 𝑞 q-Pochhammer-symbol 𝑏 superscript 𝑎 1 𝑞 𝑞 q-Pochhammer-symbol 𝑞 superscript 𝑎 𝑏 1 𝑞 𝑛 superscript fragments ( a b ) 𝑛 superscript 𝑞 superscript 𝑛 2 Kronecker-delta 𝑚 𝑛 fragments ( a b 1 , q b a ) {\displaystyle{\displaystyle{\displaystyle\sum_{x=0}^{\infty}\frac{(1-q^{2x}a^% {-2})\left(a^{-2},(ab)^{-1};q\right)_{x}}{(1-a^{-2})\left(q,bqa^{-1};q\right)_% {x}}(ba^{-1})^{x}q^{x^{2}}Q_{m}\!\left(\frac{1}{2}(aq^{-x}+a^{-1}q^{x});a,b\,;% \,q^{-1}\right)Q_{n}\!\left(\frac{1}{2}(aq^{-x}+a^{-1}q^{x});a,b\,;\,q^{-1}% \right)=\frac{\left(qa^{-2};q\right)_{\infty}}{\left(ba^{-1}q;q\right)_{\infty% }}\left(q,(ab)^{-1};q\right)_{n}(ab)^{n}q^{-n^{2}}\delta_{m,n}(ab>1,\;qb<a)}}}

Proof

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Symbols List

Σ Σ {\displaystyle{\displaystyle{\displaystyle\Sigma}}}  : sum : http://drmf.wmflabs.org/wiki/Definition:sum
( a ; q ) n subscript 𝑎 𝑞 𝑛 {\displaystyle{\displaystyle{\displaystyle(a;q)_{n}}}}  : q 𝑞 {\displaystyle{\displaystyle{\displaystyle q}}} -Pochhammer symbol : http://dlmf.nist.gov/5.18#i http://dlmf.nist.gov/17.2#SS1.p1
Q n subscript 𝑄 𝑛 {\displaystyle{\displaystyle{\displaystyle Q_{n}}}}  : q 𝑞 {\displaystyle{\displaystyle{\displaystyle q}}} -inverse Al-Salam-Chihara polynomial : http://dlmf.nist.gov/23.1
δ m , n subscript 𝛿 𝑚 𝑛 {\displaystyle{\displaystyle{\displaystyle\delta_{m,n}}}}  : Kronecker delta : http://dlmf.nist.gov/front/introduction#Sx4.p1.t1.r4

Bibliography

Equation in Section 14.8 of KLS.

URL links

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