The flux reconstruction (FR) method offers a simple, efficient, and easy to implement method, and it has been shown to equate to a differential approach to discontinuous Galerkin (DG) methods. The FR method is also accurate to an arbitrary order and the isentropic Euler vortex problem is used here to empirically verify this claim. This problem is widely used in computational fluid dynamics (CFD) to verify the accuracy of a given numerical method due to its simplicity and known exact solution at any given time. While verifying our FR solver, multiple obstacles emerged that prevented us from achieving the expected order of accuracy over short and long amounts of simulation time. It was found that these complications stemmed from a few overloo...
Popular high-order schemes with compact stencils for Computational Fluid Dynamics (CFD) include Disc...
This study focuses on the dispersion and diffusion characteristics of high-order energy-stable flux ...
We begin by investigating the stability, order of accuracy, and dispersion and dissipation character...
A computational fluid dynamics code based on the flux reconstruction (FR) method is currently being ...
Theoretical studies and numerical experiments suggest that unstructured high-order methods...
High-order methods are quickly becoming popular for turbulent flows as the amount of computer proces...
High-order methods have become of increasing interest in recent years in computational physics. This...
A numerical investigation of finite volume (FV) and discontinuous Galerkin (DG) finite element metho...
This work examines the feasibility of a novel high-order numerical method, which has been termed Flu...
AbstractThe Flux Reconstruction (FR) approach offers an efficient route to achieving high-order accu...
An assessment of two numerical formulations for high-order reconstruction on unstructured triangular...
The numerical solution of the Euler or Navier-Stokes equations by Lagrangian vortex methods is discu...
Abstract. Vortex methods are numerical schemes for approximating solutions to the Navier-Stokes equa...
The Flux Reconstruction (FR) approach offers an efficient route to achieving high-order accuracy on ...
A critical assessment of the accuracy of Cartesian-mesh approaches for steady, transonic solutions o...
Popular high-order schemes with compact stencils for Computational Fluid Dynamics (CFD) include Disc...
This study focuses on the dispersion and diffusion characteristics of high-order energy-stable flux ...
We begin by investigating the stability, order of accuracy, and dispersion and dissipation character...
A computational fluid dynamics code based on the flux reconstruction (FR) method is currently being ...
Theoretical studies and numerical experiments suggest that unstructured high-order methods...
High-order methods are quickly becoming popular for turbulent flows as the amount of computer proces...
High-order methods have become of increasing interest in recent years in computational physics. This...
A numerical investigation of finite volume (FV) and discontinuous Galerkin (DG) finite element metho...
This work examines the feasibility of a novel high-order numerical method, which has been termed Flu...
AbstractThe Flux Reconstruction (FR) approach offers an efficient route to achieving high-order accu...
An assessment of two numerical formulations for high-order reconstruction on unstructured triangular...
The numerical solution of the Euler or Navier-Stokes equations by Lagrangian vortex methods is discu...
Abstract. Vortex methods are numerical schemes for approximating solutions to the Navier-Stokes equa...
The Flux Reconstruction (FR) approach offers an efficient route to achieving high-order accuracy on ...
A critical assessment of the accuracy of Cartesian-mesh approaches for steady, transonic solutions o...
Popular high-order schemes with compact stencils for Computational Fluid Dynamics (CFD) include Disc...
This study focuses on the dispersion and diffusion characteristics of high-order energy-stable flux ...
We begin by investigating the stability, order of accuracy, and dispersion and dissipation character...