Sull'integrazione dell'equazione \(\frac{\partial^2\varphi}{\partial t^2}-\sum\limits_1^m{}_i\frac{\partial^2\varphi}{\partial x_i^2} = 0\). (Q1518298)
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scientific article; zbMATH DE number 2670776
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Sull'integrazione dell'equazione \(\frac{\partial^2\varphi}{\partial t^2}-\sum\limits_1^m{}_i\frac{\partial^2\varphi}{\partial x_i^2} = 0\). |
scientific article; zbMATH DE number 2670776 |
Statements
Sull'integrazione dell'equazione \(\frac{\partial^2\varphi}{\partial t^2}-\sum\limits_1^m{}_i\frac{\partial^2\varphi}{\partial x_i^2} = 0\). (English)
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1898
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Das von Volterra (Rom. Acc. L. Rend. (5) \(1_2\), 265-277; F. d. M. 24, 984-988, 1892, JFM 24.0984.02) angewandte Verfahren für den Fall \(m=2\) ist vom Verf. auf den Fall \(m=3\) ausgedehnt worden (Rom. Acc. L. Rend. (5) \(5_1\), 357-360; F. d. M. 27, 702, 1896, JFM 27.0702.02). In dieser Arbeit wird dasselbe Verfahren auf den Fall beliebiger Werte von \(m\) ausgedehnt.
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