| 13.4.1 | |||
| , | |||
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ⓘ
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| 13.4.2 | |||
| , | |||
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ⓘ
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| 13.4.3 | |||
| . | |||
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For the function see §10.2(ii).
| 13.4.4 | |||
| , , | |||
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ⓘ
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| 13.4.5 | |||
| , , | |||
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ⓘ
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| 13.4.6 | |||
| , , , | |||
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ⓘ
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| 13.4.7 | |||
| , | |||
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ⓘ
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| 13.4.8 | |||
| , | |||
|
ⓘ
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where is arbitrary, . For the functions and see §10.25(ii) and §§15.1, 15.2(i).
| 13.4.9 | |||
| , . | |||
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ⓘ
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| 13.4.10 | |||
| , . | |||
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ⓘ
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| 13.4.11 | |||
| . | |||
|
ⓘ
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The contour of integration starts and terminates at a point on the real axis between and . It encircles and once in the positive sense, and then once in the negative sense. See Figure 13.4.1. The fractional powers are continuous and assume their principal values at . Similar conventions also apply to the remaining integrals in this subsection.
| 13.4.12 | |||
| , . | |||
|
ⓘ
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At the point where the contour crosses the interval , and the function assume their principal values; compare §§15.1 and 15.2(i). A special case is
| 13.4.13 | |||
| . | |||
|
ⓘ
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| 13.4.14 | |||
| , . | |||
|
ⓘ
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The contour cuts the real axis between and . At this point the fractional powers are determined by and .
| 13.4.15 | |||
| . | |||
|
ⓘ
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Again, and the function assume their principal values where the contour (see Figure 5.9.1) intersects the positive real axis.
If , then
| 13.4.16 | |||
| , | |||
|
ⓘ
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where the contour of integration separates the poles of from those of .
If and , then
| 13.4.17 | |||
| , | |||
|
ⓘ
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where the contour of integration separates the poles of from those of .
| 13.4.18 | |||
| , | |||
|
ⓘ
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where the contour of integration passes all the poles of on the right-hand side.