Darboux Transformations for Orthogonal Differential Systems and Differential Galois Theory

TL;DR

This paper generalizes Darboux transformations for higher-order and tensor product differential systems, providing explicit methods and applications in quantum mechanics and integrable systems, with implementations in Maple.

Contribution

It introduces a systematic approach to extend Darboux transformations to third-order orthogonal systems and symmetric powers of SL(2,C)-systems, including explicit formulas and SUSY models.

Findings

Explicit Darboux transformations for third-order orthogonal systems.

Framework for extending Darboux transformations to tensor products.

Implementation and testing in Maple.

Abstract

Darboux developed an ingenious algebraic mechanism to construct infinite chains of ''integrable'' second-order differential equations as well as their solutions. After a surprisingly long time, Darboux's results were rediscovered and applied in many frameworks, for instance in quantum mechanics (where they provide useful tools for supersymmetric quantum mechanics), in soliton theory, Lax pairs and many other fields involving hierarchies of equations. In this paper, we propose a method which allows us to generalize the Darboux transformations algorithmically for tensor product constructions on linear differential equations or systems. We obtain explicit Darboux transformations for third-order orthogonal systems ($\mathfrak{so}(3, C_K)$ systems) as well as a framework to extend Darboux transformations to any symmetric power of $\mathrm{SL}(2,\mathbb{C})$-systems. We introduce SUSY toy models for these tensor products, giving as an illustration the analysis of some shape invariant potentials. All results in this paper have been implemented and tested in the computer algebra system Maple.