A standard two-dimensional Galerkin finite-element method (GFEM) code for coupled Navier-Stokes and energy equations is used with h -adaptive meshing based on a posteriori error estimation using the superconvergent patch recovery technique for solving a range of advection-dominated transport problems. It is demonstrated that such a method provides a highly effective, simple, and efficient way of dealing with the perennial problems in numerical modeling of advection-dominated transport, such as oscillations or wiggles with central difference-type discretizations (such as GFEM) and numerical ("false") diffusion when wiggle-suppressant schemes are used. Additionally, the auto-adaptive finite-element method provides a powerful means of achievin...
An hp-adaptive finite element model based on mesh refinement and increasing spectral order is used t...
Development of 3-dimensional self-adaptive algorithms for unstructured finite element grids is recen...
The numerical approximation of processes of transport and diffusion can be very challenging when the...
A standard two-dimensional Galerkin nite-element method (GFEM) code for coupled Navier–Stokes and ...
An unstructured-grid, h-adaptive control-volume finite element method (CVFEM) was formulated, implem...
Self-adaptive algorithms for 2 and 3-dimensional unstructured finite element grids are recent to the...
Abstract: Adaptive discontinuous Galerkin methods are formulated to solve reactive transport problem...
We present a robust and efficient target-based mesh adaptation methodology, building on hy-bridized ...
A three-step hp-adaptive finite element model (FEM) is employed to solve the governing equations for...
The investigation of laminar natural convection in vertical channels with multiple obstructions on o...
We propose a pre-processing mesh re-distribution algorithm based upon harmonic maps employed in con...
A two-equation turbulence closure model (k-co) using an h-adaptive grid technique and finite element...
High-order numerical methods such as Discontinuous Galerkin, Spectral Difference, and Flux Reconstru...
The investigation of laminar natural convection in vertical obstructed channels is conducted using a...
This paper considers nonsteady convection-dominated flows with stiff source terms. As a unified appr...
An hp-adaptive finite element model based on mesh refinement and increasing spectral order is used t...
Development of 3-dimensional self-adaptive algorithms for unstructured finite element grids is recen...
The numerical approximation of processes of transport and diffusion can be very challenging when the...
A standard two-dimensional Galerkin nite-element method (GFEM) code for coupled Navier–Stokes and ...
An unstructured-grid, h-adaptive control-volume finite element method (CVFEM) was formulated, implem...
Self-adaptive algorithms for 2 and 3-dimensional unstructured finite element grids are recent to the...
Abstract: Adaptive discontinuous Galerkin methods are formulated to solve reactive transport problem...
We present a robust and efficient target-based mesh adaptation methodology, building on hy-bridized ...
A three-step hp-adaptive finite element model (FEM) is employed to solve the governing equations for...
The investigation of laminar natural convection in vertical channels with multiple obstructions on o...
We propose a pre-processing mesh re-distribution algorithm based upon harmonic maps employed in con...
A two-equation turbulence closure model (k-co) using an h-adaptive grid technique and finite element...
High-order numerical methods such as Discontinuous Galerkin, Spectral Difference, and Flux Reconstru...
The investigation of laminar natural convection in vertical obstructed channels is conducted using a...
This paper considers nonsteady convection-dominated flows with stiff source terms. As a unified appr...
An hp-adaptive finite element model based on mesh refinement and increasing spectral order is used t...
Development of 3-dimensional self-adaptive algorithms for unstructured finite element grids is recen...
The numerical approximation of processes of transport and diffusion can be very challenging when the...