Related papers: Transferable Model for Shape Optimization subject to Physical Constraints

Transferable Model for Shape Optimization subject to Physical Constraints

URL: http://arxiv.org/abs/2103.10805v1
Date: Fri, 19 Mar 2021 13:49:21 GMT
Title: Transferable Model for Shape Optimization subject to Physical Constraints
Authors: Lukas Harsch, Johannes Burgbacher, Stefan Riedelbauch
Abstract summary: We provide a method which enables a neural network to transform objects subject to given physical constraints. An U-Net architecture is used to learn the underlying physical behaviour of fluid flows. The network is used to infer the solution of flow simulations.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: The interaction of neural networks with physical equations offers a wide range of applications. We provide a method which enables a neural network to transform objects subject to given physical constraints. Therefore an U-Net architecture is used to learn the underlying physical behaviour of fluid flows. The network is used to infer the solution of flow simulations, which will be shown for a wide range of generic channel flow simulations. Physical meaningful quantities can be computed on the obtained solution, e.g. the total pressure difference or the forces on the objects. A Spatial Transformer Network with thin-plate-splines is used for the interaction between the physical constraints and the geometric representation of the objects. Thus, a transformation from an initial to a target geometry is performed such that the object is fulfilling the given constraints. This method is fully differentiable i.e., gradient informations can be used for the transformation. This can be seen as an inverse design process. The advantage of this method over many other proposed methods is, that the physical constraints are based on the inferred flow field solution. Thus, we have a transferable model which can be applied to varying problem setups and is not limited to a given set of geometry parameters or physical quantities.

Related papers

Towards Universal Mesh Movement Networks [13.450178050669964]
We introduce the Universal Mesh Movement Network (UM2N) UM2N can be applied in a non-intrusive, zero-shot manner to move meshes with different size distributions and structures. We evaluate our method on advection and Navier-Stokes based examples, as well as a real-world tsunami simulation case.
arXiv Detail & Related papers (2024-06-29T09:35:12Z)
Transolver: A Fast Transformer Solver for PDEs on General Geometries [66.82060415622871]
We present Transolver, which learns intrinsic physical states hidden behind discretized geometries. By calculating attention to physics-aware tokens encoded from slices, Transovler can effectively capture intricate physical correlations. Transolver achieves consistent state-of-the-art with 22% relative gain across six standard benchmarks and also excels in large-scale industrial simulations.
arXiv Detail & Related papers (2024-02-04T06:37:38Z)
Physics-informed neural networks for transformed geometries and manifolds [0.0]
We propose a novel method for integrating geometric transformations within PINNs to robustly accommodate geometric variations. We demonstrate the enhanced flexibility over traditional PINNs, especially under geometric variations. The proposed framework presents an outlook for training deep neural operators over parametrized geometries.
arXiv Detail & Related papers (2023-11-27T15:47:33Z)
Learning the solution operator of two-dimensional incompressible Navier-Stokes equations using physics-aware convolutional neural networks [68.8204255655161]
We introduce a technique with which it is possible to learn approximate solutions to the steady-state Navier--Stokes equations in varying geometries without the need of parametrization. The results of our physics-aware CNN are compared to a state-of-the-art data-based approach.
arXiv Detail & Related papers (2023-08-04T05:09:06Z)
DeepMLS: Geometry-Aware Control Point Deformation [76.51312491336343]
We introduce DeepMLS, a space-based deformation technique, guided by a set of displaced control points. We leverage the power of neural networks to inject the underlying shape geometry into the deformation parameters. Our technique facilitates intuitive piecewise smooth deformations, which are well suited for manufactured objects.
arXiv Detail & Related papers (2022-01-05T23:55:34Z)
Revisiting Transformation Invariant Geometric Deep Learning: Are Initial Representations All You Need? [80.86819657126041]
We show that transformation-invariant and distance-preserving initial representations are sufficient to achieve transformation invariance. Specifically, we realize transformation-invariant and distance-preserving initial point representations by modifying multi-dimensional scaling. We prove that TinvNN can strictly guarantee transformation invariance, being general and flexible enough to be combined with the existing neural networks.
arXiv Detail & Related papers (2021-12-23T03:52:33Z)
DeepPhysics: a physics aware deep learning framework for real-time simulation [0.0]
We propose a solution to simulate hyper-elastic materials using a data-driven approach. A neural network is trained to learn the non-linear relationship between boundary conditions and the resulting displacement field. The results show that our network architecture trained with a limited amount of data can predict the displacement field in less than a millisecond.
arXiv Detail & Related papers (2021-09-17T12:15:47Z)
ResNet-LDDMM: Advancing the LDDMM Framework Using Deep Residual Networks [86.37110868126548]
In this work, we make use of deep residual neural networks to solve the non-stationary ODE (flow equation) based on a Euler's discretization scheme. We illustrate these ideas on diverse registration problems of 3D shapes under complex topology-preserving transformations.
arXiv Detail & Related papers (2021-02-16T04:07:13Z)
Scalable Differentiable Physics for Learning and Control [99.4302215142673]
Differentiable physics is a powerful approach to learning and control problems that involve physical objects and environments. We develop a scalable framework for differentiable physics that can support a large number of objects and their interactions.
arXiv Detail & Related papers (2020-07-04T19:07:51Z)
Physics Informed Deep Learning for Transport in Porous Media. Buckley Leverett Problem [0.0]
We present a new hybrid physics-based machine-learning approach to reservoir modeling. The methodology relies on a series of deep adversarial neural network architecture with physics-based regularization. The proposed methodology is a simple and elegant way to instill physical knowledge to machine-learning algorithms.
arXiv Detail & Related papers (2020-01-15T08:20:11Z)

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