BiHom-Lie brackets and the Toda equation

TL;DR

This paper introduces a BiHom-Lie algebra structure on $rak{gl}(V)$ using automorphisms, studies its application to the Toda lattice, and derives explicit solutions, revealing symmetry properties and obstructions.

Contribution

It constructs a new BiHom-Lie algebra framework for the Toda equation and explores its implications, including explicit solutions and symmetry analysis.

Findings

Deformation of Toda flow via BiHom-Lie brackets

Explicit solutions for 2x2 blocks using inverse scattering

Identification of symmetry breaking in hyperbolic case

Abstract

We introduce a BiHom-type skew-symmetric bracket on $\mathfrak{gl}(V)$ built from two commuting inner automorphisms $\alpha=Ad_\psi$ and $\beta=Ad_\phi$ with $\psi,\phi\in \mathfrak{gl}(V)$ and integers $i,j$. We prove that $(\mathfrak{gl}(V),[\cdot,\cdot]^{(i,j)}_{(\psi,\phi)},\alpha,\beta)$ is a BiHom--Lie algebra, and we study the Lax equation obtained by replacing the commutator in the finite nonperiodic Toda lattice by this bracket. For the symmetric choice $\phi=\psi$ with $(i,j)=(0,0)$, the deformed flow is equivariant under conjugation and becomes gauge-equivalent, via $\widetilde L=\psi^{-1}L\psi$, to a Toda-type Lax equation with a conjugated triangular projection. In particular, scalar deformations amount to a constant rescaling of time. On embedded $2\times2$ blocks, we derive explicit trigonometric and hyperbolic formulas that make symmetry constraints (e.g. tracelessness) transparent. In the asymmetric hyperbolic case, we exhibit a trace obstruction showing that the right-hand side is generically not a commutator, which amounts to symmetry breaking of the isospectral property. We further extend the construction to the weakly coupled Toda lattice with an indefinite metric and provide explicit $2\times2$ solutions via an inverse-scattering calculation, clarifying and correcting certain formulas in the literature. The classical Toda dynamics are recovered at special parameter values.