On the classification of scalar evolution equations with non-constant separant
DOI10.1088/1751-8121/50/3/035202zbMath1418.37110arXiv1605.01173OpenAlexW3105976651MaRDI QIDQ2959725
Ayse Humeyra Bilge, Eti Mizrahi
Publication date: 9 February 2017
Published in: Journal of Physics A: Mathematical and Theoretical (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1605.01173
Completely integrable infinite-dimensional Hamiltonian and Lagrangian systems, integration methods, integrability tests, integrable hierarchies (KdV, KP, Toda, etc.) (37K10) Relations of infinite-dimensional Hamiltonian and Lagrangian dynamical systems with infinite-dimensional Lie algebras and other algebraic structures (37K30)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Towards the classification of scalar nonpolynomial evolution equations: quasilinearity
- Classification of third order integrable evolution equations
- Solitons in physics, mathematics, and nonlinear optics. Proceedings of two workshops which were an integral part of the 1988-89 IMA program on nonlinear waves
- On the integrability of homogeneous scalar evolution equations
- On the integrability of non-polynomial scalar evolution equations
- A Method for Finding N-Soliton Solutions of the K.d.V. Equation and K.d.V.-Like Equation
- ‘Level grading’ a new graded algebra structure on differential polynomials: application to the classification of scalar evolution equations
- Toward the Classification of Scalar Nonpolynomial Evolution Equations: Polynomiality in Top Three Derivatives
- Method for Solving the Korteweg-deVries Equation
- On the Inverse Scattering Problem for Cubic Eigenvalue Problems of the Class ψxxx + 6Qψx + 6Rψ = λψ
- Evolution equations possessing infinitely many symmetries
- On the equivalence of linearization and formal symmetries as integrability tests for evolution equations
This page was built for publication: On the classification of scalar evolution equations with non-constant separant
