Related papers: Generative emulation of chaotic dynamics with coherent prior

Generative emulation of chaotic dynamics with coherent prior

URL: http://arxiv.org/abs/2504.14264v1
Date: Sat, 19 Apr 2025 11:14:40 GMT
Title: Generative emulation of chaotic dynamics with coherent prior
Authors: Juan Nathaniel, Pierre Gentine,
Abstract summary: We present an efficient generative framework for dynamics emulation, unifying principles of turbulence with diffusion-based modeling: Cohesion.<n>Specifically, our method estimates large-scale coherent structure of the underlying dynamics as guidance during the denoising process.<n>Cohesion superior long-range forecasting skill can efficiently generate physically-consistent simulations, even in the presence of partially-observed guidance.
Score: 0.129182926254119
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Data-driven emulation of nonlinear dynamics is challenging due to long-range skill decay that often produces physically unrealistic outputs. Recent advances in generative modeling aim to address these issues by providing uncertainty quantification and correction. However, the quality of generated simulation remains heavily dependent on the choice of conditioning priors. In this work, we present an efficient generative framework for dynamics emulation, unifying principles of turbulence with diffusion-based modeling: Cohesion. Specifically, our method estimates large-scale coherent structure of the underlying dynamics as guidance during the denoising process, where small-scale fluctuation in the flow is then resolved. These coherent priors are efficiently approximated using reduced-order models, such as deep Koopman operators, that allow for rapid generation of long prior sequences while maintaining stability over extended forecasting horizon. With this gain, we can reframe forecasting as trajectory planning, a common task in reinforcement learning, where conditional denoising is performed once over entire sequences, minimizing the computational cost of autoregressive-based generative methods. Empirical evaluations on chaotic systems of increasing complexity, including Kolmogorov flow, shallow water equations, and subseasonal-to-seasonal climate dynamics, demonstrate Cohesion superior long-range forecasting skill that can efficiently generate physically-consistent simulations, even in the presence of partially-observed guidance.

Related papers

Dynamical Diffusion: Learning Temporal Dynamics with Diffusion Models [71.63194926457119]
We introduce Dynamical Diffusion (DyDiff), a theoretically sound framework that incorporates temporally aware forward and reverse processes.<n>Experiments across scientifictemporal forecasting, video prediction, and time series forecasting demonstrate that Dynamical Diffusion consistently improves performance in temporal predictive tasks.
arXiv Detail & Related papers (2025-03-02T16:10:32Z)
Improved deep learning of chaotic dynamical systems with multistep penalty losses [0.0]
Predicting the long-term behavior of chaotic systems remains a formidable challenge. This paper introduces a novel framework that addresses these challenges by leveraging the recently proposed multi-step penalty operators.
arXiv Detail & Related papers (2024-10-08T00:13:57Z)
Physics-guided Active Sample Reweighting for Urban Flow Prediction [75.24539704456791]
Urban flow prediction is a nuanced-temporal modeling that estimates the throughput of transportation services like buses, taxis and ride-driven models. Some recent prediction solutions bring remedies with the notion of physics-guided machine learning (PGML) We develop a atized physics-guided network (PN), and propose a data-aware framework Physics-guided Active Sample Reweighting (P-GASR)
arXiv Detail & Related papers (2024-07-18T15:44:23Z)
Bayesian Conditional Diffusion Models for Versatile Spatiotemporal Turbulence Generation [13.278744447861289]
We introduce a novel generative framework grounded in probabilistic diffusion models for turbulence generation. A notable feature of our approach is the proposed method for long-span flow sequence generation, which is based on autoregressive-based conditional sampling. We showcase the versatile turbulence generation capability of our framework through a suite of numerical experiments.
arXiv Detail & Related papers (2023-11-14T04:08:14Z)
Efficient Dynamics Modeling in Interactive Environments with Koopman Theory [22.7309724944471]
We show how to efficiently parallelize the sequential problem of long-range prediction using convolution. We also show that this model can be easily incorporated into dynamics modeling for model-based planning and model-free RL.
arXiv Detail & Related papers (2023-06-20T23:38:24Z)
Conditional Denoising Diffusion for Sequential Recommendation [62.127862728308045]
Two prominent generative models, Generative Adversarial Networks (GANs) and Variational AutoEncoders (VAEs) GANs suffer from unstable optimization, while VAEs are prone to posterior collapse and over-smoothed generations. We present a conditional denoising diffusion model, which includes a sequence encoder, a cross-attentive denoising decoder, and a step-wise diffuser.
arXiv Detail & Related papers (2023-04-22T15:32:59Z)
Stabilizing Machine Learning Prediction of Dynamics: Noise and Noise-inspired Regularization [58.720142291102135]
Recent has shown that machine learning (ML) models can be trained to accurately forecast the dynamics of chaotic dynamical systems. In the absence of mitigating techniques, this technique can result in artificially rapid error growth, leading to inaccurate predictions and/or climate instability. We introduce Linearized Multi-Noise Training (LMNT), a regularization technique that deterministically approximates the effect of many small, independent noise realizations added to the model input during training.
arXiv Detail & Related papers (2022-11-09T23:40:52Z)
Mining Causality from Continuous-time Dynamics Models: An Application to Tsunami Forecasting [22.434845478979604]
We propose a mechanism for mining causal structures from continuous-time models. We train models to capture the causal structure by enforcing sparsity in the weights of the input layers of the dynamics models. We apply our method to a real-world problem, namely tsunami forecasting, where the exact causal-structures are difficult to characterize.
arXiv Detail & Related papers (2022-10-10T18:53:13Z)
Accelerated Continuous-Time Approximate Dynamic Programming via Data-Assisted Hybrid Control [0.0]
We introduce an algorithm that incorporates dynamic momentum in actor-critic structures to control continuous-time dynamic plants with an affine structure in the input. By incorporating dynamic momentum in our algorithm, we are able to accelerate the convergence properties of the closed-loop system.
arXiv Detail & Related papers (2022-04-27T05:36:51Z)
Stochastically forced ensemble dynamic mode decomposition for forecasting and analysis of near-periodic systems [65.44033635330604]
We introduce a novel load forecasting method in which observed dynamics are modeled as a forced linear system. We show that its use of intrinsic linear dynamics offers a number of desirable properties in terms of interpretability and parsimony. Results are presented for a test case using load data from an electrical grid.
arXiv Detail & Related papers (2020-10-08T20:25:52Z)
Multiplicative noise and heavy tails in stochastic optimization [62.993432503309485]
empirical optimization is central to modern machine learning, but its role in its success is still unclear. We show that it commonly arises in parameters of discrete multiplicative noise due to variance. A detailed analysis is conducted in which we describe on key factors, including recent step size, and data, all exhibit similar results on state-of-the-art neural network models.
arXiv Detail & Related papers (2020-06-11T09:58:01Z)

This list is automatically generated from the titles and abstracts of the papers in this site.