In this article, we detail the methodology developed to construct arbitrarily high order schemes - linear and WENO - on 3D mixed-element unstructured meshes made up of general convex polyhedral elements. The approach is tailored specifically for the solution of scalar level set equations for application to incompressible two-phase flow problems. The construction of WENO schemes on 3D unstructured meshes is notoriously difficult, as it involves a much higher level of complexity than 2D approaches. This due to the multiplicity of geometrical considerations introduced by the extra dimension, especially on mixed-element meshes. Therefore, we have specifically developed a number of algorithms to handle mixed-element meshes composed of convex pol...
This work presents three algorithms for the level set modeling of phase boundaries. The application...
A numerical method for the simulation of three-dimensional incompressible two-phase flows is present...
The goal of the research is to extend level set theory to moving boundary Stefan problems and automa...
The paper extends weighted essentially non-oscillatory (WENO) methods to three dimensional mixed-ele...
Numerical simulation of incompressible multiphase flows with immiscible fluids is still a challengin...
In this article we detail the methodology developed to construct an efficient interface description ...
Since the seminal work of [92] on coupling the level set method of [69] to the equations for two-pha...
This paper presents a methodology for simulation of two-phase flows with surface tension in the fram...
The background to this review paper is research we have performed over recent years aimed at develop...
In this article, we describe a parallel adaptive mesh refinement strategy for two-phase flows using ...
This paper presents a stabilized ¯nite element method for the solution of incom-pressible two-phase ...
Borrowing from techniques developed for conservation law equations, we have developed both monotone ...
This thesis addresses parallel algorithms for three-dimensional two-phase flow simulations on adapti...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
The paper discusses finite volume WENO reconstruction applied to simulation of compressible 3D Euler...
This work presents three algorithms for the level set modeling of phase boundaries. The application...
A numerical method for the simulation of three-dimensional incompressible two-phase flows is present...
The goal of the research is to extend level set theory to moving boundary Stefan problems and automa...
The paper extends weighted essentially non-oscillatory (WENO) methods to three dimensional mixed-ele...
Numerical simulation of incompressible multiphase flows with immiscible fluids is still a challengin...
In this article we detail the methodology developed to construct an efficient interface description ...
Since the seminal work of [92] on coupling the level set method of [69] to the equations for two-pha...
This paper presents a methodology for simulation of two-phase flows with surface tension in the fram...
The background to this review paper is research we have performed over recent years aimed at develop...
In this article, we describe a parallel adaptive mesh refinement strategy for two-phase flows using ...
This paper presents a stabilized ¯nite element method for the solution of incom-pressible two-phase ...
Borrowing from techniques developed for conservation law equations, we have developed both monotone ...
This thesis addresses parallel algorithms for three-dimensional two-phase flow simulations on adapti...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
The paper discusses finite volume WENO reconstruction applied to simulation of compressible 3D Euler...
This work presents three algorithms for the level set modeling of phase boundaries. The application...
A numerical method for the simulation of three-dimensional incompressible two-phase flows is present...
The goal of the research is to extend level set theory to moving boundary Stefan problems and automa...