Pressure projection is the single most computationally expensive step in an unsteady incompressible fluid simulation. This work demonstrates the ability of data-driven methods to accelerate the approximate solution of the Poisson equation at the heart of pressure projection. Geometric Multi-Grid methods are identified as linear convolutional encoder-decoder networks and a data-driven smoother is developed using automatic differentiation to optimize the velocity-divergence projection. The new method is found to accelerate classic Multi-Grid methods by a factor of two to three with no loss of accuracy on eleven 2D and 3D flow cases including cases with dynamic immersed solid boundaries. The optimal parameters are found to transfer nearly 100%...
An original strategy to address hydrodynamic flow was recently proposed through a high-order weakly-...
Summarization: ForthenumericalsolutionofincompressibleNavier-Stokesequations using a high order acc...
iv This dissertation presents efficient and scalable algorithms for the simulation of in-compressibl...
Pressure projection is the single most computationally expensive step in an unsteady incompressible ...
Pressure projection is the single most computationally expensive step in an unsteady incompressible ...
We describe several numerical solvers for the pressure Poisson equation arising in models of incompr...
There are two main requirements for practical simulation of unsteady flow at high Reynolds number: t...
In this thesis, we describe a globally second-order accurate sharp immersed boundary projection meth...
The main objective of this thesis is to accelerate deflated Conjugate Gradient solvers used for solv...
An analysis of existing and newly derived fast-projection methods for the numerical integration of i...
In order to reduce the computational difficulty associated with a single grid (SG) solution procedur...
We present a multi-block finite-difference solver for massively parallel Direct Numerical Simulation...
We propose and evaluate fast, scalable approaches for solving the linear complementarity problems (L...
none5This paper provides an analysis of a projection method for the solution of the unsteady incompr...
The main objective of this thesis is to accelerate the solvers used for solving the pressure Poisson...
An original strategy to address hydrodynamic flow was recently proposed through a high-order weakly-...
Summarization: ForthenumericalsolutionofincompressibleNavier-Stokesequations using a high order acc...
iv This dissertation presents efficient and scalable algorithms for the simulation of in-compressibl...
Pressure projection is the single most computationally expensive step in an unsteady incompressible ...
Pressure projection is the single most computationally expensive step in an unsteady incompressible ...
We describe several numerical solvers for the pressure Poisson equation arising in models of incompr...
There are two main requirements for practical simulation of unsteady flow at high Reynolds number: t...
In this thesis, we describe a globally second-order accurate sharp immersed boundary projection meth...
The main objective of this thesis is to accelerate deflated Conjugate Gradient solvers used for solv...
An analysis of existing and newly derived fast-projection methods for the numerical integration of i...
In order to reduce the computational difficulty associated with a single grid (SG) solution procedur...
We present a multi-block finite-difference solver for massively parallel Direct Numerical Simulation...
We propose and evaluate fast, scalable approaches for solving the linear complementarity problems (L...
none5This paper provides an analysis of a projection method for the solution of the unsteady incompr...
The main objective of this thesis is to accelerate the solvers used for solving the pressure Poisson...
An original strategy to address hydrodynamic flow was recently proposed through a high-order weakly-...
Summarization: ForthenumericalsolutionofincompressibleNavier-Stokesequations using a high order acc...
iv This dissertation presents efficient and scalable algorithms for the simulation of in-compressibl...