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Main Author: Luesink, Erwin
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.22215
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author Luesink, Erwin
author_facet Luesink, Erwin
contents We present a geometric construction of irreversible dynamics on Poisson manifolds that satisfies the axioms of metriplectic mechanics and the GENERIC framework. Our approach relies solely on the underlying Poisson structure and its deformation theory, without requiring any additional metric structure. Specifically, we show that if the second Lichnerowicz-Poisson cohomology group of a Poisson manifold is nontrivial, one can construct a symmetric bracket that generates irreversible dynamics compatible with energy conservation and entropy production. This bracket is derived from a 2-cocycle that deforms the original Poisson structure, thereby modifying the associated Casimir foliation. We illustrate the construction with two finite-dimensional examples, the duals of the Lie algebras of the special Euclidean group SE(2) and the Galilei group SGal(3). These examples demonstrate the applicability of the method in classical mechanics, control theory, and mathematical physics. Our framework naturally extends to infinite-dimensional settings, which are discussed as directions for future work.
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publishDate 2025
record_format arxiv
spellingShingle Irreversible dynamics on Poisson manifolds
Luesink, Erwin
Mathematical Physics
We present a geometric construction of irreversible dynamics on Poisson manifolds that satisfies the axioms of metriplectic mechanics and the GENERIC framework. Our approach relies solely on the underlying Poisson structure and its deformation theory, without requiring any additional metric structure. Specifically, we show that if the second Lichnerowicz-Poisson cohomology group of a Poisson manifold is nontrivial, one can construct a symmetric bracket that generates irreversible dynamics compatible with energy conservation and entropy production. This bracket is derived from a 2-cocycle that deforms the original Poisson structure, thereby modifying the associated Casimir foliation. We illustrate the construction with two finite-dimensional examples, the duals of the Lie algebras of the special Euclidean group SE(2) and the Galilei group SGal(3). These examples demonstrate the applicability of the method in classical mechanics, control theory, and mathematical physics. Our framework naturally extends to infinite-dimensional settings, which are discussed as directions for future work.
title Irreversible dynamics on Poisson manifolds
topic Mathematical Physics
url https://arxiv.org/abs/2506.22215