We present an approach to designing arbitrarily high-order finitevolume spatial discretizations on locally-rectangular grids. It is based on the use of a simple class of high-order quadratures for computing the average of fluxes over faces. This approach has the advantage of being a variation on widely-used second-order methods, so that the prior experience in engineering those methods carries over in the higher-order case. Among the issues discussed are the basic design principles for uniform grids, the extension to locally-refined nest grid hierarchies, and the treatment of complex geometries using mapped grids, multiblock grids, and cut-cell representations
The present work implements the spectral finite volume scheme in a cell centered finite volume conte...
2022 Summer.Includes bibliographical references.Computational fluid dynamics (CFD) is an invaluable ...
In this work we briefly describe a technique to define second order finite volume schemes on non uni...
We present an approach to designing arbitrarily high-order finitevolume spatial discretizations on l...
Non UBCUnreviewedAuthor affiliation: University of California Lawrence Berkeley National LabOthe
International audienceIn this paper, a new framework to design high-order approximations in the cont...
This paper presents a high order finite volume scheme built on a new k-exact reconstruction algorith...
One of the main barriers to wide adoption of high-order numerical methods in industrial applications...
International audienceThis paper shows how to compute a high order approximant in a given cell using...
Many areas require a very high-order accurate numerical solution of conservation laws for complex sh...
Currently used finite volume methods are essentially low order methods. In this paper, we present a ...
An improved high resolution finite volume method based on linear and quadratic variable reconstructi...
This paper considers the design of adaptive finite-volume discretizations for conservation laws. The...
The impact of grid cell geometry on the accuracy of a high order discretization is studied. The issu...
International audienceWe present a high-order piecewise polynomial approximation for finite volume s...
The present work implements the spectral finite volume scheme in a cell centered finite volume conte...
2022 Summer.Includes bibliographical references.Computational fluid dynamics (CFD) is an invaluable ...
In this work we briefly describe a technique to define second order finite volume schemes on non uni...
We present an approach to designing arbitrarily high-order finitevolume spatial discretizations on l...
Non UBCUnreviewedAuthor affiliation: University of California Lawrence Berkeley National LabOthe
International audienceIn this paper, a new framework to design high-order approximations in the cont...
This paper presents a high order finite volume scheme built on a new k-exact reconstruction algorith...
One of the main barriers to wide adoption of high-order numerical methods in industrial applications...
International audienceThis paper shows how to compute a high order approximant in a given cell using...
Many areas require a very high-order accurate numerical solution of conservation laws for complex sh...
Currently used finite volume methods are essentially low order methods. In this paper, we present a ...
An improved high resolution finite volume method based on linear and quadratic variable reconstructi...
This paper considers the design of adaptive finite-volume discretizations for conservation laws. The...
The impact of grid cell geometry on the accuracy of a high order discretization is studied. The issu...
International audienceWe present a high-order piecewise polynomial approximation for finite volume s...
The present work implements the spectral finite volume scheme in a cell centered finite volume conte...
2022 Summer.Includes bibliographical references.Computational fluid dynamics (CFD) is an invaluable ...
In this work we briefly describe a technique to define second order finite volume schemes on non uni...