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| 13.6.2 | ||||
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| 13.6.3 | ||||
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| 13.6.4 | ||||
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For the notation see §§6.2(i), 7.2(i), 8.2(i), and 8.19(i). When is an integer or is a positive integer the Kummer functions can be expressed as incomplete gamma functions (or generalized exponential integrals). For example,
| 13.6.5 | |||
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| 13.6.6 | |||
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Special cases are the error functions
| 13.6.7 | |||
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| 13.6.8 | |||
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When the Kummer functions can be expressed as modified Bessel functions. For the notation see §§10.25(ii) and 9.2(i).
and in the case that is an integer we have
Note that (13.6.11_1) and (13.6.11_2) are special cases of (13.11.1) and (13.11.2), respectively
For the notation see §12.2.
| 13.6.12 | |||
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| 13.6.13 | |||
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| 13.6.14 | |||
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| 13.6.15 | |||
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| 13.6.16 | ||||
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| 13.6.17 | ||||
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| 13.6.18 | ||||
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| 13.6.19 | |||
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| 13.6.20 | |||
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| 13.6.21 | |||
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For the definition of when neither nor is a nonpositive integer see §16.5.