An updated Arbitrary-Lagrangian-Eulerian (UALE) coordinate system is proposed to solve problems in continuum mechanics. It is compared to and distinguished from an ALE system. The governing equations in differential and integral forms in an UALE system are derived. A key feature of the UALE system is that the current position coordinates defined in a Cartesian Eulerian Spatial System (CESS) are chosen as the reference coordinates to investigate the motion of the continuum. When the reference point moves to a new position, the reference coordinates are updated to the new position coordinates in CESS. This UALE system and the updated Lagrangian (UL) system have the same base vectors as the CESS at each point in space, which provides a conveni...
The primary objective of discrete mechanics is to unify various laws from different areas of physics...
AbstractThis paper presents several parallelization aspects of Fluid-Structure Interaction (FSI) pro...
In this work, we present a Fully Eulerian framework for fluid-structure interaction (fsi) problems co...
Aim of the present chapter is to provide an in-depth survey of arbitrary Lagrangian-Eulerian (ALE) m...
Based on the fundamental equations of continuum mechanics, the concept of Hamilton's principle and t...
The fluid-structure coupling is a natural phenomenon which reflects the effects of two continuums: f...
The computational procedure presented in this study is focussed on the time-dependent solution of tw...
The interaction problem of incompressible fluid and incompressible elastic material in the so-called...
The aim of this treatise is to present a harmonious mathematical formulation of an explicit moving m...
The theory of continuous dynamical systems is developed with an intrinsic geometric approach based o...
A new formulation for two-dimensional fluid-rigid body interaction problems is developed. In particu...
We briefly describe a setting of a non-linear fluid-structure interaction problem and its solution i...
The dynamics of Lagrangian systems is formulated with a differential geometric approach and accordin...
This work introduces a new Arbitrary Lagrangian Eulerian mixed formulation based on a hyperbolic sys...
Nonlocally related systems for the Euler and Lagrange systems of two-dimensional dynamical nonlinear...
The primary objective of discrete mechanics is to unify various laws from different areas of physics...
AbstractThis paper presents several parallelization aspects of Fluid-Structure Interaction (FSI) pro...
In this work, we present a Fully Eulerian framework for fluid-structure interaction (fsi) problems co...
Aim of the present chapter is to provide an in-depth survey of arbitrary Lagrangian-Eulerian (ALE) m...
Based on the fundamental equations of continuum mechanics, the concept of Hamilton's principle and t...
The fluid-structure coupling is a natural phenomenon which reflects the effects of two continuums: f...
The computational procedure presented in this study is focussed on the time-dependent solution of tw...
The interaction problem of incompressible fluid and incompressible elastic material in the so-called...
The aim of this treatise is to present a harmonious mathematical formulation of an explicit moving m...
The theory of continuous dynamical systems is developed with an intrinsic geometric approach based o...
A new formulation for two-dimensional fluid-rigid body interaction problems is developed. In particu...
We briefly describe a setting of a non-linear fluid-structure interaction problem and its solution i...
The dynamics of Lagrangian systems is formulated with a differential geometric approach and accordin...
This work introduces a new Arbitrary Lagrangian Eulerian mixed formulation based on a hyperbolic sys...
Nonlocally related systems for the Euler and Lagrange systems of two-dimensional dynamical nonlinear...
The primary objective of discrete mechanics is to unify various laws from different areas of physics...
AbstractThis paper presents several parallelization aspects of Fluid-Structure Interaction (FSI) pro...
In this work, we present a Fully Eulerian framework for fluid-structure interaction (fsi) problems co...