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11: 34.2 Definition: Symbol
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►The quantities in the symbol are called angular momenta.
…The corresponding projective quantum numbers
are given by
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34.2.4
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►where is defined as in §16.2.
►For alternative expressions for the symbol, written either as a finite sum or as other terminating generalized hypergeometric series of unit argument, see Varshalovich et al. (1988, §§8.21, 8.24–8.26).
12: 1.3 Determinants, Linear Operators, and Spectral Expansions
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►The cofactor
of is
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►For real-valued ,
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►where are the th roots of unity (1.11.21).
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►If tends to a limit as , then we say that the infinite determinant
converges and .
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►The corresponding eigenvectors can be chosen such that they form a complete orthonormal basis in .
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13: 1.12 Continued Fractions
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and are called the th (canonical) numerator and denominator respectively.
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is equivalent to if there is a sequence , ,
, such that … ►Define … ►The continued fraction converges when … ►Then the convergents satisfy …
, such that … ►Define … ►The continued fraction converges when … ►Then the convergents satisfy …
14: 26.9 Integer Partitions: Restricted Number and Part Size
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denotes the number of partitions of into at most parts.
See Table 26.9.1.
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►It follows that also equals the number of partitions of into parts that are less than or equal to .
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is the number of partitions of into at most parts, each less than or equal to .
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15: 16.12 Products
16: 16.3 Derivatives and Contiguous Functions
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16.3.1
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16.3.3
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►Two generalized hypergeometric functions are (generalized)
contiguous if they have the same pair of values of and , and corresponding parameters differ by integers.
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16.3.7
►For further examples see §§13.3(i), 15.5(ii), and the following references: Rainville (1960, §48), Wimp (1968), and Luke (1975, §5.13).
17: 35.8 Generalized Hypergeometric Functions of Matrix Argument
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►The generalized hypergeometric function with matrix argument , numerator parameters , and denominator parameters is
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§35.8(iii) Case
… ►Let . … ►Let ; one of the be a negative integer; , , , . … ►Again, let . …18: 16.1 Special Notation
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►The main functions treated in this chapter are the generalized hypergeometric function , the Appell (two-variable hypergeometric) functions , , , , and the Meijer -function .
Alternative notations are , , and for the generalized hypergeometric function, , , , , for the Appell functions, and for the Meijer -function.
nonnegative integers. | |
… | |
real or complex parameters. | |
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vector . | |
vector . | |
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19: 16.18 Special Cases
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►The and functions introduced in Chapters 13 and 15, as well as the more general functions introduced in the present chapter, are all special cases of the Meijer -function.
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16.18.1
►As a corollary, special cases of the and functions, including Airy functions, Bessel functions, parabolic cylinder functions, Ferrers functions, associated Legendre functions, and many orthogonal polynomials, are all special cases of the Meijer -function.
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