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Brief lectures on duality, integrability and deformations

Ctirad Klimčík

2021Reviews in Mathematical Physics18 citationsDOIOpen Access PDF

Abstract

We provide a pedagogical introduction to some aspects of integrability, dualities and deformations of physical systems in [Formula: see text] and in [Formula: see text] dimensions. In particular, we concentrate on the T-duality of point particles and strings as well as on the Ruijsenaars duality of finite many-body integrable models, we review the concept of the integrability and, in particular, of the Lax integrability and we analyze the basic examples of the Yang–Baxter deformations of nonlinear [Formula: see text]-models. The central mathematical structure which we describe in detail is the [Formula: see text]-model which is the dynamical system exhibiting all those three phenomena simultaneously. The last part of the paper contains original results, in particular, a formulation of sufficient conditions for strong integrability of non-degenerate [Formula: see text]-models.

Topics & Concepts

Integrable systemDuality (order theory)MathematicsPoint (geometry)Lax pairMathematical structureNonlinear systemAlgebra over a fieldDynamical systems theoryPhysical systemPure mathematicsDeformation (meteorology)Theoretical physicsT-dualityType (biology)Nonlinear dynamical systemsPhysicsNonlinear Waves and SolitonsAlgebraic structures and combinatorial modelsHomotopy and Cohomology in Algebraic Topology