Book contents
- Frontmatter
- Contents of Volume 1
- Contents of Volume 2
- Integrable Systems: A Celebration of Emma Previato’s 65th Birthday
- 1 Trace Ideal Properties of a Class of Integral Operators
- 2 Explicit Symmetries of the Kepler Hamiltonian
- 3 A Note on the Commutator of Hamiltonian Vector Fields
- 4 Nodal Curves and a Class of Solutions of the Lax Equation for Shock Clustering and Burgers Turbulence
- 5 Solvable Dynamical Systems in the Plane with Polynomial Interactions
- 6 The Projection Method in Classical Mechanics
- 7 Pencils of Quadrics, Billiard Double-Reflection and Confocal Incircular Nets
- 8 Bi-Flat F-Manifolds: A Survey
- 9 The Periodic 6-Particle Kac-van Moerbeke System
- 10 Integrable Mappings from a Unified Perspective
- 11 On an Arnold-Liouville Type Theorem for the Focusing NLS and the Focusing mKdV Equations
- 12 Commuting Hamiltonian Flows of Curves in Real Space Forms
- 13 The Kowalewski Top Revisited
- 14 The Calogero-Franc¸oise Integrable System: Algebraic Geometry, Higgs Fields, and the Inverse Problem
- 15 Tropical Markov Dynamics and Cayley Cubic
- 16 Positive One–Point Commuting Difference Operators∗†
5 - Solvable Dynamical Systems in the Plane with Polynomial Interactions
Published online by Cambridge University Press: 19 March 2020
- Frontmatter
- Contents of Volume 1
- Contents of Volume 2
- Integrable Systems: A Celebration of Emma Previato’s 65th Birthday
- 1 Trace Ideal Properties of a Class of Integral Operators
- 2 Explicit Symmetries of the Kepler Hamiltonian
- 3 A Note on the Commutator of Hamiltonian Vector Fields
- 4 Nodal Curves and a Class of Solutions of the Lax Equation for Shock Clustering and Burgers Turbulence
- 5 Solvable Dynamical Systems in the Plane with Polynomial Interactions
- 6 The Projection Method in Classical Mechanics
- 7 Pencils of Quadrics, Billiard Double-Reflection and Confocal Incircular Nets
- 8 Bi-Flat F-Manifolds: A Survey
- 9 The Periodic 6-Particle Kac-van Moerbeke System
- 10 Integrable Mappings from a Unified Perspective
- 11 On an Arnold-Liouville Type Theorem for the Focusing NLS and the Focusing mKdV Equations
- 12 Commuting Hamiltonian Flows of Curves in Real Space Forms
- 13 The Kowalewski Top Revisited
- 14 The Calogero-Franc¸oise Integrable System: Algebraic Geometry, Higgs Fields, and the Inverse Problem
- 15 Tropical Markov Dynamics and Cayley Cubic
- 16 Positive One–Point Commuting Difference Operators∗†
Summary
In this paper we report a few examples of algebraically solvable dynamical systems characterized by 2 coupled Ordinary Differential Equations which read as follows: $\dot{x}_{n}=P^{\left( n\right) }\left( x_{1},x_{2}\right), n=1,2,$; with $P^{\left( n\right) }\left( x_{1},x_{2}\right)$ specific polynomials of relatively low degree in the 2 dependent variables $x_{1}\equiv x_{1}\left( t\right)$ and $x_{2}\equiv x_{2}\left( t\right)$. These findings are obtained via a new twist of a recent technique to identify dynamical systems solvable by algebraic operations, themselves explicitly identified as corresponding to the time evolutions of the zeros of polynomials the coefficients of which evolve according to algebraically solvable (systems of) evolution equations.
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- Integrable Systems and Algebraic Geometry , pp. 93 - 108Publisher: Cambridge University PressPrint publication year: 2020