On certain definite integrals whose values can be expressed in terms of \textit{Bessel}'s functions. (Q1489243)
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scientific article; zbMATH DE number 2637267
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On certain definite integrals whose values can be expressed in terms of \textit{Bessel}'s functions. |
scientific article; zbMATH DE number 2637267 |
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On certain definite integrals whose values can be expressed in terms of \textit{Bessel}'s functions. (English)
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1908
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Es sei \(0<b<a\), \(m=2\sqrt{ab}\), \(\tau=\sqrt{b/a}\); dann ist \[ \int_0^\infty \cos\left(ax+\frac{b}{x}\right)\frac{dx}{1+x^2}=\frac12\;\pi e^{-(a-b)}-\pi(\iota J_1+\tau^3J_\iota+\tau^5J_5+\cdots), \] wo \(m=2\sqrt{ab}\) das Argument der \textit{Bessel}schen Funktionen ist. Ferner: \[ \begin{matrix} &\int_0^\infty\sin\left(ax+\frac{b}{x}\right)&\frac{xdx}{1+x^2}&=\frac12\;\pi e^{-(a-b)}-(\tau^2 J_2+\tau^4 J_4+\tau^6 J_6+\cdots).\\ &P\int_0^\infty\cos\left(ax+\frac{b}{x}\right)&\frac{dx}{1-x^2}&=\frac12 \pi\sin(a+b)-\pi(\tau J_1-\tau^3J_3+\cdots).\\ &P\int_0^\infty\sin\left(ax+\frac{b}{x}\right)&\frac{xdx}{1-x^2}&=-\frac12\;\pi\cos(a+b)-\pi(\tau^2J_2-\tau^4J_4+\cdots).\end{matrix} \] \[ (\text{P}=\text{Principal value}.) \]
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