With and replaced by , Bessel’s equation (10.2.1) becomes
| 10.24.1 | |||
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For and define
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and
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where is real and continuous with ; compare (5.4.3). Then
| 10.24.4 | ||||
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and , are linearly independent solutions of (10.24.1):
| 10.24.5 | |||
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As , with fixed,
| 10.24.6 | ||||
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As , with fixed,
| 10.24.7 | ||||
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| 10.24.8 | ||||
| , | ||||
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and
| 10.24.9 | |||
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where denotes Euler’s constant §5.2(ii).
In consequence of (10.24.6), when is large and comprise a numerically satisfactory pair of solutions of (10.24.1); compare §2.7(iv). Also, in consequence of (10.24.7)–(10.24.9), when is small either and or and comprise a numerically satisfactory pair depending whether or .
For graphs of and see §10.3(iii).
For mathematical properties and applications of and , including zeros and uniform asymptotic expansions for large , see Dunster (1990a). In this reference and are denoted respectively by and .