If in in such a way that for all , then
| 13.8.1 | |||
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For fixed and in
| 13.8.2 | |||
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as in , where and
| 13.8.3 | |||
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When the foregoing results are combined with Kummer’s transformation (13.2.39), an approximation is obtained for the case when is large, and and are bounded.
Let and with . Then
| 13.8.4 | |||
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and
| 13.8.5 | |||
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as , uniformly in compact -intervals of and compact real -intervals. For the parabolic cylinder function see §12.2, and for an extension to an asymptotic expansion see Temme (1978).
Special cases are
| 13.8.6 | |||
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and
| 13.8.7 | |||
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To obtain approximations for and that hold as , with and combine (13.14.4), (13.14.5) with §13.20(i).
Also, more complicated—but more powerful—uniform asymptotic approximations can be obtained by combining (13.14.4), (13.14.5) with §§13.20(iii) and 13.20(iv).
For other asymptotic expansions for large and see López and Pagola (2010).
For more asymptotic expansions for the cases see Temme (2015, §§10.4 and 22.5)
When with () fixed,
| 13.8.8 | |||
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where , and . (13.8.8) holds uniformly with respect to . For the case the transformation (13.2.40) can be used.
For an extension to an asymptotic expansion complete with error bounds see Temme (1990b), and for related results see §13.21(i).
When with () fixed,
| 13.8.9 | |||
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and
| 13.8.10 | |||
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uniformly with respect to bounded positive values of in each case.
For asymptotic approximations to and as that hold uniformly with respect to and bounded positive values of , combine (13.14.4), (13.14.5) with §§13.21(ii), 13.21(iii).
When in and and fixed,
| 13.8.11 | |||
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| 13.8.12 | |||
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| 13.8.13 | |||
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| 13.8.14 | |||
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where and
| 13.8.15 | ||||
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where and
| 13.8.16 | ||||||
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For the Bernoulli numbers see §24.2(i) and for proofs and similar results in which can also be unbounded see Temme (2015, Chapters 10 and 27)
When with and bounded
| 13.8.17 | |||
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| 13.8.18 | |||
| , | |||
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where is the scaled gamma function defined in (5.11.3). These results follow from Temme (2022), which can also be used to obtain more terms in the expansions. For generalizations in which is also allowed to be large see Temme and Veling (2022).