Quantization of one-phase potentials and Painlevé equations (Q2703992)
From MaRDI portal
| This is the item page for this Wikibase entity, intended for internal use and editing purposes. Please use this page instead for the normal view: Quantization of one-phase potentials and Painlevé equations |
scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Quantization of one-phase potentials and Painlevé equations |
scientific article |
Statements
12 December 2001
0 references
Quantization of one-phase potentials and Painlevé equations (English)
0 references
Here, the author extends his method developed for the investigation of the first Painlevé equation in order to study other Painlevé equations. He proves several statements common for all Painlevé equations, such as the following theorem:NEWLINENEWLINENEWLINELet \(\varepsilon\) be some positive number. Then the system NEWLINE\[NEWLINE\varepsilon\partial_{\lambda}L_{j} - \partial_{x}A_{j} + [L_{j}, A_{j}] = 0NEWLINE\]NEWLINE is equivalent to the system NEWLINE\[NEWLINE \partial_{x}X = \varepsilon, u'' - P_{j}(u, u', X) = 0, NEWLINE\]NEWLINE where \(j = 1,\dots, 6\) and \(L_{j}, A_{j}\) are corresponding Lax pairs. In conclusion, the author uses these results for obtaining ansatzes for other Painlevé equations.
0 references