Development of a novel high-order flux correction method on strand grids is presented. The method uses a combination of flux correction in the unstructured plane and summation-by-parts operators in the strand direction to achieve high-fidelity solutions. Low-order truncation errors are cancelled with accurate flux and solution gradients in the flux correction method, thereby achieving a formal order of accuracy of 3, although higher orders are often obtained, especially for highly viscous flows. In this work, the scheme is extended to high-Reynolds number computations in both two and three dimensions. Turbulence closure is achieved with a robust version of the Spalart-Allmaras turbulence model that accommodates negative values of the turbul...
A method is presented, that combines the defect and deferred correction approaches to approximate so...
High-order methods have become of increasing interest in recent years in computational physics. This...
Traditionally, finite element methods generate progressively higher order accurate solutions by use ...
Simulations of fluid flows over complex geometries are typically solved using a solution technique k...
A novel high-order finite volume scheme using flux correction methods in conjunction with structured...
This work examines the application of a high-order numerical method to strand-based grids to solve t...
The strand-Cartesian grid approach is a unique method of generating and computing fluid dynamic simu...
This paper is concerned with the application of k-exact finite volume methods for compressible Reyno...
This paper is concerned with the application of k-exact finite volume methods for compressible Reyno...
This work examines the feasibility of a novel high-order numerical method, which has been termed Flu...
A two-dimensional, non-linear diffusion-limited colliding plumes simulations were used to demonstrat...
High-order numerical methods for unstructured grids combine the superior accuracy of high-order spec...
A solution algorithm using Hamiltonian paths and strand grids is presented for compressible Reynolds...
A Godunov's type unstructured finite volume method suitable for highly compressible turbulent scale-...
A 3D high-order RANS solver in conservative variables has been developed, based on a discontinuous ...
A method is presented, that combines the defect and deferred correction approaches to approximate so...
High-order methods have become of increasing interest in recent years in computational physics. This...
Traditionally, finite element methods generate progressively higher order accurate solutions by use ...
Simulations of fluid flows over complex geometries are typically solved using a solution technique k...
A novel high-order finite volume scheme using flux correction methods in conjunction with structured...
This work examines the application of a high-order numerical method to strand-based grids to solve t...
The strand-Cartesian grid approach is a unique method of generating and computing fluid dynamic simu...
This paper is concerned with the application of k-exact finite volume methods for compressible Reyno...
This paper is concerned with the application of k-exact finite volume methods for compressible Reyno...
This work examines the feasibility of a novel high-order numerical method, which has been termed Flu...
A two-dimensional, non-linear diffusion-limited colliding plumes simulations were used to demonstrat...
High-order numerical methods for unstructured grids combine the superior accuracy of high-order spec...
A solution algorithm using Hamiltonian paths and strand grids is presented for compressible Reynolds...
A Godunov's type unstructured finite volume method suitable for highly compressible turbulent scale-...
A 3D high-order RANS solver in conservative variables has been developed, based on a discontinuous ...
A method is presented, that combines the defect and deferred correction approaches to approximate so...
High-order methods have become of increasing interest in recent years in computational physics. This...
Traditionally, finite element methods generate progressively higher order accurate solutions by use ...