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relation to generalized hypergeometric functions

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1: 16.7 Relations to Other Functions
§16.7 Relations to Other Functions
2: 16.24 Physical Applications
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§16.24(iii) 3 โข j , 6 โข j , and 9 โข j Symbols
3: 16.18 Special Cases
§16.18 Special Cases
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4: 7.11 Relations to Other Functions
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Generalized Hypergeometric Functions
5: 10.39 Relations to Other Functions
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Generalized Hypergeometric Functions and Hypergeometric Function
6: 10.16 Relations to Other Functions
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Generalized Hypergeometric Functions
7: 16.17 Definition
โ–บThen …
8: 18.34 Bessel Polynomials
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§18.34(i) Definitions and Recurrence Relation
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18.34.1 y n โก ( x ; a ) = F 0 2 โก ( n , n + a 1 ; x 2 ) = ( n + a 1 ) n โข ( x 2 ) n โข F 1 1 โก ( n 2 โข n a + 2 ; 2 x ) = n ! โข ( 1 2 โข x ) n โข L n ( 1 a 2 โข n ) โก ( 2 โข x 1 ) = ( 1 2 โข x ) 1 1 2 โข a โข e 1 / x โข W 1 1 2 โข a , 1 2 โข ( a 1 ) + n โก ( 2 โข x 1 ) .
9: 18.20 Hahn Class: Explicit Representations
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§18.20(ii) Hypergeometric Function and Generalized Hypergeometric Functions
10: 18.38 Mathematical Applications
โ–บThe Askey–Gasper inequality