English

Yang--Baxter maps, Darboux transformations, and linear approximations of refactorisation problems

Exactly Solvable and Integrable Systems 2020-12-22 v1 Mathematical Physics math.MP Quantum Algebra

Abstract

Yang--Baxter maps (YB maps) are set-theoretical solutions to the quantum Yang--Baxter equation. For a set X=Ω×VX=\Omega\times V, where VV is a vector space and Ω\Omega is regarded as a space of parameters, a linear parametric YB map is a YB map Y ⁣:X×XX×XY\colon X\times X\to X\times X such that YY is linear with respect to VV and one has πY=π\pi Y=\pi for the projection π ⁣:X×XΩ×Ω\pi\colon X\times X\to\Omega\times\Omega. These conditions are equivalent to certain nonlinear algebraic relations for the components of YY. Such a map YY may be nonlinear with respect to parameters from Ω\Omega. We present general results on such maps, including clarification of the structure of the algebraic relations that define them and several transformations which allow one to obtain new such maps from known ones. Also, methods for constructing such maps are described. In particular, developing an idea from [Konstantinou-Rizos S and Mikhailov A V 2013 J. Phys. A: Math. Theor. 46 425201], we demonstrate how to obtain linear parametric YB maps from nonlinear Darboux transformations of some Lax operators using linear approximations of matrix refactorisation problems corresponding to Darboux matrices. New linear parametric YB maps with nonlinear dependence on parameters are presented.

Keywords

Cite

@article{arxiv.2009.00045,
  title  = {Yang--Baxter maps, Darboux transformations, and linear approximations of refactorisation problems},
  author = {V. M. Buchstaber and S. Igonin and S. Konstantinou-Rizos and M. M. Preobrazhenskaia},
  journal= {arXiv preprint arXiv:2009.00045},
  year   = {2020}
}

Comments

22 pages

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