$\mathrm{PGL}(3)$-invariant integrable systems from factorisation of linear differential and difference operators
Abstract
In this paper, we present a unified approach to constructing continuous and discrete -invariant integrable systems, formulated in terms of the common dependent variables , from linear spectral problems and their factorisation. Starting from third-order spectral problems, we first provide explicit forms of the differential and difference invariants, generalising the Schwarzian derivative and cross-ratio to the rank- setting. The factorisation induces dualities among linear spectral problems, underlying the exact discretisation and multi-dimensional consistency of the associated Boussinesq systems. Then, we derive both continuous and discrete -invariant Boussinesq systems, representing natural rank- generalisations of the Schwarzian KdV and cross-ratio equations. A geometric lifting-decoupling mechanism is developed to explain the reduction of these systems to the -invariant Boussinesq equations. Finally, we derive a -invariant system of generating PDEs together with its Lagrangian structure, in which the lattice parameters serve as independent variables, providing the generating PDE system for the Boussinesq hierarchy.
Cite
@article{arxiv.2603.18386,
title = {$\mathrm{PGL}(3)$-invariant integrable systems from factorisation of linear differential and difference operators},
author = {Frank Nijhoff and Linyu Peng and Cheng Zhang and Da-jun Zhang},
journal= {arXiv preprint arXiv:2603.18386},
year = {2026}
}
Comments
46 pages