Simulating turbulent flows is crucial for a wide range of applications, and machine learning-based solvers are gaining increasing relevance. However, achieving stability when generalizing to longer rollout horizons remains a persistent challenge for learned PDE solvers. We address this challenge by introducing a fully data-driven fluid solver that utilizes an autoregressive rollout based on conditional diffusion models. We show that this approach offers clear advantages in terms of rollout stability compared to other learned baselines. Remarkably, these improvements in stability are achieved without compromising the quality of generated samples, and our model successfully generalizes to flow parameters beyond the training regime. Additional...
The objective is to provide clear and well-motivated guidance to Machine Learning (ML) teams, founde...
Fluid motion and its richness of detail are described by theNavier-Stokes equations. Most of the num...
In this paper, we propose hybrid data-driven ROM closures for fluid flows. These new ROM closures co...
Machine learning models are gaining increasing popularity in the domain of fluid dynamics for their ...
In this paper, we train turbulence models based on convolutional neural networks. These learned turb...
Physical models with uncertain inputs are commonly represented as parametric partial differential eq...
A convolutional encoder-decoder-based transformer model has been developed to autoregressively train...
Generalisability and the consistency of the a posteriori results are the most critical points of vie...
Diffusion models have emerged as a pivotal advancement in generative models, setting new standards t...
© 2017 Elsevier Inc. Exascale-level simulations require fault-resilient algorithms that are robust a...
The objective of this paper is to briefly introduce conditional moment closure (CMC) methods for pre...
When modeling a turbulent fluid flow, an Approximate Deconvolution Model (ADM) is sometimes chosen -...
A sizeable proportion of the work in this thesis focuses on a new turbulence model, dubbed ADC (the ...
Accelerating the numerical integration of partial differential equations by learned surrogate model ...
International audienceIn this paper, we present a new method to quantify the uncertainty introduced ...
The objective is to provide clear and well-motivated guidance to Machine Learning (ML) teams, founde...
Fluid motion and its richness of detail are described by theNavier-Stokes equations. Most of the num...
In this paper, we propose hybrid data-driven ROM closures for fluid flows. These new ROM closures co...
Machine learning models are gaining increasing popularity in the domain of fluid dynamics for their ...
In this paper, we train turbulence models based on convolutional neural networks. These learned turb...
Physical models with uncertain inputs are commonly represented as parametric partial differential eq...
A convolutional encoder-decoder-based transformer model has been developed to autoregressively train...
Generalisability and the consistency of the a posteriori results are the most critical points of vie...
Diffusion models have emerged as a pivotal advancement in generative models, setting new standards t...
© 2017 Elsevier Inc. Exascale-level simulations require fault-resilient algorithms that are robust a...
The objective of this paper is to briefly introduce conditional moment closure (CMC) methods for pre...
When modeling a turbulent fluid flow, an Approximate Deconvolution Model (ADM) is sometimes chosen -...
A sizeable proportion of the work in this thesis focuses on a new turbulence model, dubbed ADC (the ...
Accelerating the numerical integration of partial differential equations by learned surrogate model ...
International audienceIn this paper, we present a new method to quantify the uncertainty introduced ...
The objective is to provide clear and well-motivated guidance to Machine Learning (ML) teams, founde...
Fluid motion and its richness of detail are described by theNavier-Stokes equations. Most of the num...
In this paper, we propose hybrid data-driven ROM closures for fluid flows. These new ROM closures co...