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Publications in Math-Net.Ru |
Citations |
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2022 |
1. |
P. Guha, A. G. Choudhury, B. Khanra, P. G. L. Leach, “Nonlocal Constants of Motions of Equations
of Painlevé – Gambier Type and Generalized Sundman
Transformation”, Rus. J. Nonlin. Dyn., 18:1 (2022), 103–118 |
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2020 |
2. |
P. Guha, S. Garai, A. G. Choudhury, “Lax Pairs and First Integrals for Autonomous and Non-Autonomous Differential Equations Belonging to the Painlevé – Gambier List”, Rus. J. Nonlin. Dyn., 16:4 (2020), 637–650 |
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2019 |
3. |
I. Mukherjee, P. Guha, “A Study of Nonholonomic Deformations of Nonlocal Integrable Systems Belonging to the Nonlinear Schrödinger Family”, Rus. J. Nonlin. Dyn., 15:3 (2019), 293–307 |
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2017 |
4. |
Oğul Esen, Anindya Ghose Choudhury, Partha Guha, “On integrals, Hamiltonian and metriplectic formulations of polynomial systems in 3D”, Theor. Appl. Mech., 44:1 (2017), 15–34 |
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2016 |
5. |
Oğul Esen, Anindya Ghose Choudhur, Partha Guha, Hasan Gümral, “Superintegrable Cases of Four-dimensional Dynamical Systems”, Regul. Chaotic Dyn., 21:2 (2016), 175–188 |
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2014 |
6. |
Basil Grammaticos, Alfred Ramani, Partha Guha, “Second-degree Painlevé Equations and Their Contiguity Relations”, Regul. Chaotic Dyn., 19:1 (2014), 37–47 |
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2013 |
7. |
José F. Cariñena, Partha Guha, Javier de Lucas, “A Quasi-Lie Schemes Approach to Second-Order Gambier Equations”, SIGMA, 9 (2013), 026, 23 pp. |
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2012 |
8. |
A. Choudhury, P. Guha, N. A. Kudryashov, “A Lagrangian description of the higher-order Painlevé equations”, Zh. Vychisl. Mat. Mat. Fiz., 52:5 (2012), 877 ; Comput. Math. Math. Phys., 52:5 (2012), 746–755 |
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2011 |
9. |
Partha Guha, Anindya Ghose Choudhury, Basil Grammaticos, “Dynamical Studies of Equations from the Gambier Family”, SIGMA, 7 (2011), 028, 15 pp. |
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2006 |
10. |
Partha Guha, Peter J. Olver, “Geodesic Flow and Two (Super) Component Analog of the Camassa–Holm Equation”, SIGMA, 2 (2006), 054, 9 pp. |
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2003 |
11. |
P. Guha, “Geometry of Chen–Lee–Liu type derivative nonlinear Schrödinger flow”, Regul. Chaotic Dyn., 8:2 (2003), 213–224 |
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2002 |
12. |
P. Guha, “Euler–Poincaré Formalism of KDV–Burgers and Higher Order Nonlinear Schrodinger Equations”, Regul. Chaotic Dyn., 7:4 (2002), 425–434 |
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