English

Hamiltonian Lorenz-like models

Atmospheric and Oceanic Physics 2024-09-13 v1

Abstract

The reduced-complexity models developed by Edward Lorenz are widely used in atmospheric and climate sciences to study nonlinear aspect of dynamics and to demonstrate new methods for numerical weather prediction. A set of inviscid Lorenz models describing the dynamics of a single variable in a zonally-periodic domain, without dissipation and forcing, conserve energy but are not Hamiltonian. In this paper, we start from a general continuous parent fluid model, from which we derive a family of Hamiltonian Lorenz-like models through a symplectic discretization of the associated Poisson bracket that preserves the Jacobi identity. A symplectic-split integrator is also formulated. These Hamiltonian models conserve energy and maintain the nearest-neighbor couplings inherent in the original Lorenz model. As a corollary, we find that the Lorenz-96 model can be seen as a result of a poor discretization of a Poisson bracket. Hamiltonian Lorenz-like models offer promising alternatives to the original Lorenz models, especially for the qualitative representation of non-Gaussian weather extremes and wave interactions, which are key factors in understanding many phenomena of the climate system.

Keywords

Cite

@article{arxiv.2409.07920,
  title  = {Hamiltonian Lorenz-like models},
  author = {Francesco Fedele and Cristel Chandre and Martin Horvat and Nedjeljka Žagar},
  journal= {arXiv preprint arXiv:2409.07920},
  year   = {2024}
}
R2 v1 2026-06-28T18:42:19.096Z