This work concerns the enrichment of Discontinuous Galerkin (DG) bases, so that the resulting scheme provides a much better approximation of steady solutions to hyperbolic systems of balance laws. The basis enrichment leverages a prior – an approximation of the steady solution – which we propose to compute using a Physics-Informed Neural Network (PINN). To that end, after presenting the classical DG scheme, we show how to enrich its basis with a prior. Convergence results and error estimates follow, in which we prove that the basis with prior does not change the order of convergence, and that the error constant is improved. To construct the prior, we elect to use parametric PINNs, which we introduce, as well as the algorithms to construct a...
In this paper, we propose a method for constructing a neural network viscosity in order to reduce th...
El método high order Discontinuous Galerkin genera soluciones muy precisas al aumentar el orden poli...
We propose characteristic-informed neural networks (CINN), a simple and efficient machine learning a...
Physics informed neural networks (PINNs) have emerged as a powerful tool to provide robust and accur...
We consider the approximation of weak solutions of nonlinear hyperbolic PDEs using neural networks, ...
We describe an explicit Discontinuous Galerkin (DG) kinetic scheme for solving systems of balance la...
This paper is a short essay on discontinuous Galerkin methods intended for a very wide audience. We ...
We derive rigorous bounds on the error resulting from the approximation of the solution of parametri...
International audienceIn this work we explore the idea of a parameter free stabilisation method for ...
Hyperbolic balance laws are a special class of partial differential equations that represent various...
This work introduces a general strategy to develop well-balanced high-order Discontinuous Galerkin (...
High-order numerical solvers for conservation laws suer from Gibbs phenomenon close to discontinuiti...
High-dimensional PDEs have been a longstanding computational challenge. We propose to solve high-dim...
Hyperbolic conservation laws are an important part in classical physics to be able to mathematically...
We have developed in a previous work a parallel and quasi-explicit Discontinuous Galerkin (DG) kinet...
In this paper, we propose a method for constructing a neural network viscosity in order to reduce th...
El método high order Discontinuous Galerkin genera soluciones muy precisas al aumentar el orden poli...
We propose characteristic-informed neural networks (CINN), a simple and efficient machine learning a...
Physics informed neural networks (PINNs) have emerged as a powerful tool to provide robust and accur...
We consider the approximation of weak solutions of nonlinear hyperbolic PDEs using neural networks, ...
We describe an explicit Discontinuous Galerkin (DG) kinetic scheme for solving systems of balance la...
This paper is a short essay on discontinuous Galerkin methods intended for a very wide audience. We ...
We derive rigorous bounds on the error resulting from the approximation of the solution of parametri...
International audienceIn this work we explore the idea of a parameter free stabilisation method for ...
Hyperbolic balance laws are a special class of partial differential equations that represent various...
This work introduces a general strategy to develop well-balanced high-order Discontinuous Galerkin (...
High-order numerical solvers for conservation laws suer from Gibbs phenomenon close to discontinuiti...
High-dimensional PDEs have been a longstanding computational challenge. We propose to solve high-dim...
Hyperbolic conservation laws are an important part in classical physics to be able to mathematically...
We have developed in a previous work a parallel and quasi-explicit Discontinuous Galerkin (DG) kinet...
In this paper, we propose a method for constructing a neural network viscosity in order to reduce th...
El método high order Discontinuous Galerkin genera soluciones muy precisas al aumentar el orden poli...
We propose characteristic-informed neural networks (CINN), a simple and efficient machine learning a...