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Публикации в базе данных Math-Net.Ru |
Цитирования |
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2019 |
| 1. |
Roberto Camassa, Gregorio Falqui, Giovanni Ortenzi, Marco Pedroni, “On the Geometry of Extended Self-Similar Solutions of the Airy Shallow Water Equations”, SIGMA, 15 (2019), 087, 17 стр.    |
4
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2011 |
| 2. |
Gregorio Falqui, Marco Pedroni, “Poisson Pencils, Algebraic Integrability, and Separation of Variables”, Regul. Chaotic Dyn., 16:3-4 (2011), 223–244   |
3
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2002 |
| 3. |
М. Педрони, “Бигамильтоновы аспекты разделимости переменных в системе Неймана”, ТМФ, 133:3 (2002), 475–484 ; M. Pedroni, “Bi-Hamiltonian Aspects of the Separability of the Neumann System”, Theoret. and Math. Phys., 133:3 (2002), 1722–1729 |
8
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| 4. |
М. Педрони, В. Шиача, Х. П. Зубелли, “Бигамильтонова теория уравнения Гарри Дима”, ТМФ, 133:2 (2002), 311–326 ; M. Pedroni, V. Sciacca, J. P. Zubelli, “The Bi-Hamiltonian Theory of the Harry Dym Equation”, Theoret. and Math. Phys., 133:2 (2002), 1585–1597 |
9
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2000 |
| 5. |
Г. Фальки, Ф. Магри, М. Педрони, Х. П. Субелли, “Элементарный подход к полиномиальным $\tau$-функциям КП-иерархии”, ТМФ, 122:1 (2000), 23–36 ; G. Falqui, F. Magri, M. Pedroni, J. P. Zubelli, “An elementary approach to the polynomial $\tau$-functions of the KP hierarchy”, Theoret. and Math. Phys., 122:1 (2000), 17–28 |
8
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| 6. |
G. Falqui, F. Magri, M. Pedroni, J. P. Zubelli, “A Bi-Hamiltonian Theory for Stationary KDV Flows and Their Separability”, Regul. Chaotic Dyn., 5:1 (2000), 33–52 |
18
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1998 |
| 7. |
M. Pedroni, P. Vanhaecke, “A Lie algebraic generalization of the Mumford system, its symmetries and its multi-Hamiltonian structure”, Regul. Chaotic Dyn., 3:3 (1998), 132–160 |
16
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