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Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices
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| Zeitschriftentitel: | Journal of Mathematical Physics |
|---|---|
| Personen und Körperschaften: | , |
| In: | Journal of Mathematical Physics, 29, 1988, 7, S. 1593-1603 |
| Format: | E-Article |
| Sprache: | Englisch |
| veröffentlicht: |
AIP Publishing
|
| Schlagwörter: |
| author_facet |
Ragnisco, O. Santini, P. M. Ragnisco, O. Santini, P. M. |
|---|---|
| author |
Ragnisco, O. Santini, P. M. |
| spellingShingle |
Ragnisco, O. Santini, P. M. Journal of Mathematical Physics Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices Mathematical Physics Statistical and Nonlinear Physics |
| author_sort |
ragnisco, o. |
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Ragnisco, O. Santini, P. M. 0022-2488 1089-7658 AIP Publishing Mathematical Physics Statistical and Nonlinear Physics http://dx.doi.org/10.1063/1.527907 <jats:p>The recursion operator and the bi-Hamiltonian structure for an integrable two-dimensional version of the Toda chain are algorithmically derived from the corresponding linear problem. The intimate relation between two-dimensional theories and non-Abelian one-dimensional theories is emphasized. The analogies and differences between discrete and continuous integrable two-dimensional systems are pointed out and discussed.</jats:p> Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices Journal of Mathematical Physics |
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AIP Publishing, 1988 |
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AIP Publishing, 1988 |
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0022-2488 1089-7658 |
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1988 |
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AIP Publishing |
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Journal of Mathematical Physics |
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49 |
| title |
Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_unstemmed |
Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_full |
Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_fullStr |
Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_full_unstemmed |
Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_short |
Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_sort |
recursion operator and bi-hamiltonian structure for integrable multidimensional lattices |
| topic |
Mathematical Physics Statistical and Nonlinear Physics |
| url |
http://dx.doi.org/10.1063/1.527907 |
| publishDate |
1988 |
| physical |
1593-1603 |
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<jats:p>The recursion operator and the bi-Hamiltonian structure for an integrable two-dimensional version of the Toda chain are algorithmically derived from the corresponding linear problem. The intimate relation between two-dimensional theories and non-Abelian one-dimensional theories is emphasized. The analogies and differences between discrete and continuous integrable two-dimensional systems are pointed out and discussed.</jats:p> |
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| author | Ragnisco, O., Santini, P. M. |
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| description | <jats:p>The recursion operator and the bi-Hamiltonian structure for an integrable two-dimensional version of the Toda chain are algorithmically derived from the corresponding linear problem. The intimate relation between two-dimensional theories and non-Abelian one-dimensional theories is emphasized. The analogies and differences between discrete and continuous integrable two-dimensional systems are pointed out and discussed.</jats:p> |
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| id | ai-49-aHR0cDovL2R4LmRvaS5vcmcvMTAuMTA2My8xLjUyNzkwNw |
| imprint | AIP Publishing, 1988 |
| imprint_str_mv | AIP Publishing, 1988 |
| institution | DE-D275, DE-Bn3, DE-Brt1, DE-D161, DE-Gla1, DE-Zi4, DE-15, DE-Rs1, DE-Pl11, DE-105, DE-14, DE-Ch1, DE-L229 |
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| series | Journal of Mathematical Physics |
| source_id | 49 |
| spelling | Ragnisco, O. Santini, P. M. 0022-2488 1089-7658 AIP Publishing Mathematical Physics Statistical and Nonlinear Physics http://dx.doi.org/10.1063/1.527907 <jats:p>The recursion operator and the bi-Hamiltonian structure for an integrable two-dimensional version of the Toda chain are algorithmically derived from the corresponding linear problem. The intimate relation between two-dimensional theories and non-Abelian one-dimensional theories is emphasized. The analogies and differences between discrete and continuous integrable two-dimensional systems are pointed out and discussed.</jats:p> Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices Journal of Mathematical Physics |
| spellingShingle | Ragnisco, O., Santini, P. M., Journal of Mathematical Physics, Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices, Mathematical Physics, Statistical and Nonlinear Physics |
| title | Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_full | Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_fullStr | Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_full_unstemmed | Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_short | Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| title_sort | recursion operator and bi-hamiltonian structure for integrable multidimensional lattices |
| title_unstemmed | Recursion operator and bi-Hamiltonian structure for integrable multidimensional lattices |
| topic | Mathematical Physics, Statistical and Nonlinear Physics |
| url | http://dx.doi.org/10.1063/1.527907 |