Integrable two-component systems of difference equations | Zendy

Pavlos Kassotakis | Zendy; Maciej Nieszporski | Zendy; V. Papageorgiou | Zendy; Anastasios Tongas | Zendy

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Integrable two-component systems of difference equations

Author(s) -

Pavlos Kassotakis,

Maciej Nieszporski,

V. Papageorgiou,

Anastasios Tongas

Publication year - 2020

Publication title -

proceedings of the royal society a mathematical physical and engineering sciences

Language(s) - English

Resource type - Journals

eISSN - 1471-2946

pISSN - 1364-5021

DOI - 10.1098/rspa.2019.0668

Subject(s) - integrable system , novikov self consistency principle , component (thermodynamics) , scroll , mathematics , graph , pure mathematics , discrete mathematics , physics , thermodynamics , engineering , mechanical engineering

We present two lists of two-component systems of integrable difference equations defined on the edges of theZ 2 graph. The integrability of these systems is manifested by their Lax formulation which is a consequence of the multi-dimensional compatibility of these systems. Imposing constraints consistent with the systems of difference equations, we recover known integrable quad-equations including the discrete version of the Krichever–Novikov equation. The systems of difference equations give us in turn quadrirational Yang–Baxter maps.

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