Related papers: Riemannian Stochastic Interpolants for Amorphous Particle Systems

Riemannian Stochastic Interpolants for Amorphous Particle Systems

URL: http://arxiv.org/abs/2512.16607v1
Date: Thu, 18 Dec 2025 14:49:34 GMT
Title: Riemannian Stochastic Interpolants for Amorphous Particle Systems
Authors: Louis Grenioux, Leonardo Galliano, Ludovic Berthier, Giulio Biroli, Marylou Gabrié,
Abstract summary: We develop a generative framework capable of producing equilibrium configurations with well-defined geometric likelihoods.<n>Our experiments on model amorphous systems demonstrate that enforcing and symmetry constraints significantly improves generative performance.
Score: 9.933490737578111
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Modern generative models hold great promise for accelerating diverse tasks involving the simulation of physical systems, but they must be adapted to the specific constraints of each domain. Significant progress has been made for biomolecules and crystalline materials. Here, we address amorphous materials (glasses), which are disordered particle systems lacking atomic periodicity. Sampling equilibrium configurations of glass-forming materials is a notoriously slow and difficult task. This obstacle could be overcome by developing a generative framework capable of producing equilibrium configurations with well-defined likelihoods. In this work, we address this challenge by leveraging an equivariant Riemannian stochastic interpolation framework which combines Riemannian stochastic interpolant and equivariant flow matching. Our method rigorously incorporates periodic boundary conditions and the symmetries of multi-component particle systems, adapting an equivariant graph neural network to operate directly on the torus. Our numerical experiments on model amorphous systems demonstrate that enforcing geometric and symmetry constraints significantly improves generative performance.

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