| 14.2.1 | |||
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Standard solutions: , , , , , . and are real when and , and and are real when and .
Reported 2012-07-18 by Hans Volkmer and Howard Cohl
| 14.2.2 | |||
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Standard solutions: , , , , , , , .
(14.2.2) reduces to (14.2.1) when . Ferrers functions and the associated Legendre functions are related to the Legendre functions by the equations , , , , .
, , and are real when , , and , and ; and are real when and , and .
Suggested 2019-01-30 by Hans Volkmer
Equation (14.2.2) has regular singularities at , , and , with exponent pairs , , and , respectively; compare §2.7(i).
When , and , and are linearly independent, and when they are recessive at and , respectively. Hence they comprise a numerically satisfactory pair of solutions (§2.7(iv)) of (14.2.2) in the interval . When , or , and are linearly dependent, and in these cases either may be paired with almost any linearly independent solution to form a numerically satisfactory pair.
When and , and are linearly independent, and recessive at and , respectively. Hence they comprise a numerically satisfactory pair of solutions of (14.2.2) in the interval . With the same conditions, and comprise a numerically satisfactory pair of solutions in the interval .
| 14.2.3 | |||
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| 14.2.4 | |||
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| 14.2.5 | |||
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| 14.2.6 | ||||
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| 14.2.7 | ||||
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| 14.2.8 | |||
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| 14.2.9 | |||
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| 14.2.10 | |||
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| 14.2.11 | |||
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