Based on the recently developed mimetic spectral element method, we propose an effective numerical scheme for solving three-dimensional periodic incompressible Euler flows, which spatially preserves mass, kinetic energy and helicity. Preserving multiple integral invariants numerically will significantly contribute to the stability and accuracy of the numerical scheme. We start from the introduction of differential geometry and algebraic topology with which we then set up the mimetic spectral element method (the mimetic framework). With the mimetic spectral element method, physical variables can be expressed in more physical forms and the discretization error will be eliminated as much as possible. After that, we turn to Euler equations. We ...
[[abstract]]We propose a class of simple and efficient numerical scheme for incompressible fluid equ...
The computation of multiphase flows presents a subtle energetic equilibrium between potential (i.e.,...
We address here the discretization of the momentum convection operator for fluid flow simulations on...
We introduce a mimetic dual-field discretization which conserves mass, kinetic energy and helicity f...
The behaviour of an inviscid, constant density fluid on which no body forces act, may be modelled by...
Structure-conserving numerical methods that aim at preserving certain structures of the PDEs at the ...
In this work we present a mimetic spectral element discretization for the 2D incompressible Navier–S...
This thesis poses a new geometric formulation for compressible Euler flows. A partial decomposition ...
Advection is at the heart of fluid dynamics and is responsible for many interesting phenomena. Unfor...
A mixed mimetic spectral element method is applied to solve the rotating shallow water equations. Th...
A new discretization method for the three-dimensional Euler equations of gas dynamics is presented, ...
In this paper, we report a version of the Space-Time Conservation Element and Solution Element (CE/S...
We propose an efficient semi-Lagrangian Characteristic Mapping (CM) method for solving the three-dim...
The paper explains a method by which discretizations of the continuity and momentum equations can be...
Motivated by the work on stagnation-point-type exact solutions (with infinite energy) of 3D Euler fl...
[[abstract]]We propose a class of simple and efficient numerical scheme for incompressible fluid equ...
The computation of multiphase flows presents a subtle energetic equilibrium between potential (i.e.,...
We address here the discretization of the momentum convection operator for fluid flow simulations on...
We introduce a mimetic dual-field discretization which conserves mass, kinetic energy and helicity f...
The behaviour of an inviscid, constant density fluid on which no body forces act, may be modelled by...
Structure-conserving numerical methods that aim at preserving certain structures of the PDEs at the ...
In this work we present a mimetic spectral element discretization for the 2D incompressible Navier–S...
This thesis poses a new geometric formulation for compressible Euler flows. A partial decomposition ...
Advection is at the heart of fluid dynamics and is responsible for many interesting phenomena. Unfor...
A mixed mimetic spectral element method is applied to solve the rotating shallow water equations. Th...
A new discretization method for the three-dimensional Euler equations of gas dynamics is presented, ...
In this paper, we report a version of the Space-Time Conservation Element and Solution Element (CE/S...
We propose an efficient semi-Lagrangian Characteristic Mapping (CM) method for solving the three-dim...
The paper explains a method by which discretizations of the continuity and momentum equations can be...
Motivated by the work on stagnation-point-type exact solutions (with infinite energy) of 3D Euler fl...
[[abstract]]We propose a class of simple and efficient numerical scheme for incompressible fluid equ...
The computation of multiphase flows presents a subtle energetic equilibrium between potential (i.e.,...
We address here the discretization of the momentum convection operator for fluid flow simulations on...