If a nontrivial solution of Mathieu’s equation with has period or , then any linearly independent solution cannot have either period.
Second solutions of (28.2.1) are given by
| 28.5.1 | |||
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when , , and by
| 28.5.2 | |||
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when , . For , we have
| 28.5.3 | |||
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and
| 28.5.4 | |||
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compare §28.2(vi). The functions , are unique.
The factors and in (28.5.1) and (28.5.2) are normalized so that
| 28.5.5 | |||
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As with , , , , and . This determines the signs of and . (Other normalizations for and can be found in the literature, but most formulas—including connection formulas—are unaffected since and are invariant.)
| 28.5.6 | ||||
For ,
| 28.5.7 | ||||
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compare (28.2.29).
| 28.5.8 | ||||
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| 28.5.9 | ||||
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See (28.22.12) for and .