High-order methods are becoming increasingly attractive in both academia and industry, especially in the context of computational fluid dynamics. However, before they can be more widely adopted, issues such as lack of robustness in terms of numerical stability need to be addressed, particularly when treating industrial-type problems where challenging geometries and a wide range of physical scales, typically due to high Reynolds numbers, need to be taken into account. One source of instability is aliasing effects which arise from the nonlinearity of the underlying problem. In this work we detail two dealiasing strategies based on the concept of consistent integration. The first uses a localised approach, which is useful when the nonlineariti...
Turbulent flows have a large range of spatial and temporal scales which need to be resolved in order...
The use of high-order schemes continues to increase, with current methods becoming more robust and r...
The spectral analysis is a basic tool to characterise the behaviour of any convection scheme. By nat...
AbstractHigh-order methods are becoming increasingly attractive in both academia and industry, espec...
One of the strengths of the discontinuous Galerkin (DG) method has been its balance between accuracy...
High-order methods are quickly becoming popular for turbulent flows as the amount of computer proces...
This work focuses on the accuracy and stability of high-order nodal discontinuous Galerkin (DG) meth...
This thesis is concerned with the development and analysis of discontinuous spectral/hp element meth...
Discontinuous Galerkin (DG) methods have a long history in computational physics and engineering to ...
Abstract. High-order polynomial approximations of discontinuous functions give rise to oscillations ...
The study focusses on the dispersion and diffusion characteristics of discontinuous spectral element...
We present a highly-flexible Schwarz overlapping framework for simulating turbulent fluid/thermal tr...
In this thesis we analyse and develop two high-order schemes which belong to the class of discontin...
Traditionally, finite element methods generate progressively higher order accurate solutions by use ...
Spectral collocation methods have proven to be efficient discretization schemes for many aerodynamic...
Turbulent flows have a large range of spatial and temporal scales which need to be resolved in order...
The use of high-order schemes continues to increase, with current methods becoming more robust and r...
The spectral analysis is a basic tool to characterise the behaviour of any convection scheme. By nat...
AbstractHigh-order methods are becoming increasingly attractive in both academia and industry, espec...
One of the strengths of the discontinuous Galerkin (DG) method has been its balance between accuracy...
High-order methods are quickly becoming popular for turbulent flows as the amount of computer proces...
This work focuses on the accuracy and stability of high-order nodal discontinuous Galerkin (DG) meth...
This thesis is concerned with the development and analysis of discontinuous spectral/hp element meth...
Discontinuous Galerkin (DG) methods have a long history in computational physics and engineering to ...
Abstract. High-order polynomial approximations of discontinuous functions give rise to oscillations ...
The study focusses on the dispersion and diffusion characteristics of discontinuous spectral element...
We present a highly-flexible Schwarz overlapping framework for simulating turbulent fluid/thermal tr...
In this thesis we analyse and develop two high-order schemes which belong to the class of discontin...
Traditionally, finite element methods generate progressively higher order accurate solutions by use ...
Spectral collocation methods have proven to be efficient discretization schemes for many aerodynamic...
Turbulent flows have a large range of spatial and temporal scales which need to be resolved in order...
The use of high-order schemes continues to increase, with current methods becoming more robust and r...
The spectral analysis is a basic tool to characterise the behaviour of any convection scheme. By nat...