A generalized Laplace transform of generalized functions (Q2367065)
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| Language | Label | Description | Also known as |
|---|---|---|---|
| English | A generalized Laplace transform of generalized functions |
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A generalized Laplace transform of generalized functions (English)
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23 August 1993
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The following integral transform \[ F(s)= 2^{-\nu/2} \int_ 0^ \infty (st)^ \lambda e^{-st/2} D_ \nu(\sqrt{2st})f(t)dt \] where \(D_ \nu\) denotes Weber's parabolic cylinder function is extended by the authors to a class of generalized functions. This transform which reduces to Laplace transform for \(\lambda=\nu=0\) is called Weber transform. An inversion and uniqueness theorem is proved for this transform; moreover, a structure result for Weber transformable generalized functions is obtained.
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Weber's parabolic cylinder function
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generalized functions
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Laplace transform
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Weber transform
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Weber transformable generalized functions
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