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11: 24.2 Definitions and Generating Functions
§24.2 Definitions and Generating Functions
►§24.2(i) Bernoulli Numbers and Polynomials
… ►§24.2(ii) Euler Numbers and Polynomials
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12: 29.17 Other Solutions
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►If (29.2.1) admits a Lamé polynomial solution , then a second linearly independent solution is given by
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29.17.1
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►They are algebraic functions of , , and , and have primitive period .
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►Lamé–Wangerin functions are solutions of (29.2.1) with the property that is bounded on the line segment from to .
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13: 3.1 Arithmetics and Error Measures
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►with and all allowable choices of , , , and .
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►Let with and .
For given values of , , and , the format width in bits
of a computer word is the total number of bits: the sign (one bit), the significant bits ( bits), and the bits allocated to the exponent (the remaining bits).
The integers , , and are characteristics of the machine.
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►In the case of the normalized binary interchange formats, the representation of data for binary32 (previously single precision) (, , , ), binary64 (previously double precision) (, , , ) and binary128 (previously quad precision) (, , , ) are as in Figure 3.1.1.
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14: 6.20 Approximations
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Cody and Thacher (1968) provides minimax rational approximations for , with accuracies up to 20S.
Clenshaw (1962) gives Chebyshev coefficients for for and for (20D).
Luke (1969b, pp. 321–322) covers and for (the Chebyshev coefficients are given to 20D); for (20D), and for (15D). Coefficients for the sine and cosine integrals are given on pp. 325–327.
Luke (1969b, pp. 402, 410, and 415–421) gives main diagonal Padé approximations for , , (valid near the origin), and (valid for large ); approximate errors are given for a selection of -values.
15: Bibliography O
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Summing one- and two-dimensional series related to the Euler series.
J. Comput. Appl. Math. 98 (2), pp. 245–271.
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Uniform asymptotic expansions for hypergeometric functions with large parameters. III.
Analysis and Applications (Singapore) 8 (2), pp. 199–210.
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Connection formulas for second-order differential equations with multiple turning points.
SIAM J. Math. Anal. 8 (1), pp. 127–154.
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Connection formulas for second-order differential equations having an arbitrary number of turning points of arbitrary multiplicities.
SIAM J. Math. Anal. 8 (4), pp. 673–700.
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Numerical evaluation of the dilogarithm of complex argument.
Celestial Mech. Dynam. Astronom. 62 (1), pp. 93–98.
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16: 34.5 Basic Properties: Symbol
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►If any lower argument in a symbol is , , or , then the symbol has a simple algebraic form.
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34.5.6
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34.5.11
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34.5.13
►For further recursion relations see Varshalovich et al. (1988, §9.6) and Edmonds (1974, pp. 98–99).
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17: 24.9 Inequalities
§24.9 Inequalities
►Except where otherwise noted, the inequalities in this section hold for . … ►(24.9.3)–(24.9.5) hold for . … ►(24.9.6)–(24.9.7) hold for . … ►
24.9.7
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18: 15.7 Continued Fractions
19: 8.20 Asymptotic Expansions of
§8.20 Asymptotic Expansions of
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8.20.1
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8.20.2
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►For an exponentially-improved asymptotic expansion of see §2.11(iii).
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