3 years ago

Integrability and duality in spin chains.

Eyzo Stouten, Jean-Sébastien Caux, Vladimir Gritsev, Pieter W. Claeys

We construct a new, two-parametric family of integrable models and reveal their underlying duality symmetry. A modular subgroup of this duality is shown to connect non-interacting modes of different systems. We apply the new solution and duality to a Richardson-Gaudin model and generate a novel integrable system termed the $s$-$d$ wave Richardson-Gaudin-Kitaev interacting chain, interpolating $s$- and $d$- wave superconductivity. The phase diagram of this model has a topological phase transition that can be connected to the duality, where the occupancy of the non-interacting mode serves as a topological order parameter.

Publisher URL: http://arxiv.org/abs/1712.09375

DOI: arXiv:1712.09375v2

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