| 30.8.1 | |||
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where is the Ferrers function of the first kind (§14.3(i)), , and the coefficients are given by
| 30.8.2 | |||
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Let
| 30.8.3 | ||||
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Then the set of coefficients , is the solution of the difference equation
| 30.8.4 | |||
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(note that ) that satisfies the normalizing condition
| 30.8.5 | |||
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with
| 30.8.6 | |||
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Also, as ,
| 30.8.7 | |||
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and
| 30.8.8 | |||
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| 30.8.9 | |||
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where and are again the Ferrers functions and . The coefficients satisfy (30.8.4) for all when we set for . For they agree with the coefficients defined in §30.8(i). For they are determined from (30.8.4) by forward recursion using . The set of coefficients , , is the recessive solution of (30.8.4) as that is normalized by
| 30.8.10 | |||
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with
| 30.8.11 | |||
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It should be noted that if the forward recursion (30.8.4) beginning with , leads to , then is undefined for and does not exist.