Throughout §14.20 we assume that , with and . (14.2.2) takes the form
| 14.20.1 | |||
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Solutions are known as conical or Mehler functions. For and , a numerically satisfactory pair of real conical functions is and .
Another real-valued solution of (14.20.1) was introduced in Dunster (1991). This is defined by
| 14.20.2 | |||
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Equivalently,
| 14.20.3 | |||
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exists except when and ; compare §14.3(i). It is an important companion solution to when is large; compare §§14.20(vii), 14.20(viii), and 10.25(iii).
| 14.20.4 | |||
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| 14.20.5 | |||
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provided that exists.
Lastly, for the range , is a real-valued solution of (14.20.1); in terms of (which are complex-valued in general):
| 14.20.6 | |||
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The behavior of as is given in §14.8(i). For and ,
| 14.20.7 | |||
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| 14.20.8 | |||
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When ,
| 14.20.9 | |||
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| 14.20.10 | |||
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From (14.20.9) or (14.20.10) it is evident that is positive for real .
| 14.20.11 | |||
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where
| 14.20.12 | |||
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Special cases:
| 14.20.13 | |||
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| 14.20.14 | |||
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For and fixed ,
| 14.20.15 | ||||
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| 14.20.16 | ||||
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uniformly for , where and are the modified Bessel functions (§10.25(ii)) and is an arbitrary constant such that . For asymptotic expansions and explicit error bounds, see Olver (1997b, pp. 473–474). See also Žurina and Karmazina (1966).
In this subsection and §14.20(ix), and denote arbitrary constants such that and .
As ,
| 14.20.17 | |||
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| 14.20.18 | |||
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uniformly for and . Here
| 14.20.19 | |||
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| 14.20.20 | |||
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The variable is defined implicitly by
| 14.20.21 | |||
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where the inverse trigonometric functions take their principal values. The interval is mapped one-to-one to the interval , with the points and corresponding to and , respectively.
As ,
| 14.20.22 | |||
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uniformly for and . Here
| 14.20.23 | |||
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and the variable is defined by
| 14.20.24 | |||
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with the inverse tangent taking its principal value. The interval is mapped one-to-one to the interval , with the points , , and corresponding to , , and , respectively.
For zeros of see Hobson (1931, §237).
For integrals with respect to involving , see Prudnikov et al. (1990, pp. 218–228).