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Classifying integrable Egoroff hydrodynamic chains - MaRDI portal

Classifying integrable Egoroff hydrodynamic chains

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DOI10.1023/B:TAMP.0000010632.20218.62zbMath1178.37087OpenAlexW2080983027MaRDI QIDQ2654760

Maxim P. Pavlov

Publication date: 21 January 2010

Published in: Theoretical and Mathematical Physics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1023/b:tamp.0000010632.20218.62

zbMATH Keywords

theta function tau function \((2+1)\)-dimensional dispersionless equations chazy equation dispersionless hirota equations Egoroff integrable systems hydrodynamic chains and lattices

Mathematics Subject Classification ID

Completely integrable infinite-dimensional Hamiltonian and Lagrangian systems, integration methods, integrability tests, integrable hierarchies (KdV, KP, Toda, etc.) (37K10)

Related Items (16)

On kernel formulas and dispersionless Hirota equations of the extended dispersionless BKP hierarchy ⋮ Geometric structure of the classical Lagrange-d'Alembert principle and its application to integrable nonlinear dynamical systems ⋮ On a class of three-dimensional integrable Lagrangians ⋮ Lax pair for a novel two-dimensional lattice ⋮ Lie-algebraic structure of Lax-Sato integrable heavenly equations and the Lagrange-d'Alembert principle ⋮ Dispersionless Hirota equations and the genus 3 hyperelliptic divisor ⋮ Integrable partial differential equations and Lie-Rinehart algebras ⋮ On the classification of nonlinear integrable three-dimensional chains via characteristic Lie algebras ⋮ Hamiltonian systems of hydrodynamic type in \(2+1\) dimensions ⋮ Classification of integrable Vlasov-type equations ⋮ SECOND-ORDER QUASILINEAR PDEs AND CONFORMAL STRUCTURES IN PROJECTIVE SPACE ⋮ Integrable \((2+1)\)-dimensional systems of hydrodynamic type ⋮ An effective algorithm for finding multidimensional conservation laws for integrable systems of hydrodynamic type ⋮ Confluence of hypergeometric functions and integrable hydrodynamic-type systems ⋮ Classical M. A. Buhl problem, its Pfeiffer-Sato solutions, and the classical Lagrange-d'Alembert principle for the integrable heavenly-type nonlinear equations ⋮ Characteristic Lie algebras of integrable differential-difference equations in 3D

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