Eulerian shock-capturing schemes have advantages for modelling problems involving complex non-linear wave structures and large deformations in solid media. Various numerical methods now exist for solving hyperbolic conservation laws that have yet to be applied to non-linear elastic theory. In this paper one such class of solver is examined based upon characteristic tracing in conjunction with high-order monotonicity preserving weighted essentially non-oscillatory (MPWENO) reconstruction. Furthermore, a new iterative method for finding exact solutions of the Riemann problem in non-linear elasticity is presented. Access to exact solutions enables an assessment of the performance of the numerical techniques with focus on the resolution of the ...
Owing to the complex processes involved, faithful prediction of high-velocity impact events demands ...
AbstractWe show how the partial differential equations governing elasticity can be written in fully ...
The Riemann problem is an important topic in the numerical simulation of compressible flows, aiding ...
The application of Riemann Methods formulated in the Lagrangian reference frame to the numerical sim...
Many problems in solid dynamics involve moving boundaries, finite elastoplastic deformations, and st...
AbstractIf variable boundary conditions are imposed on a stretched nonlinear elastic string, element...
An Eulerian, multi-material numerical method is described for computing dynamic problems involving l...
International audienceUnder the hypothesis of small deformations, the equations of 1D elastodynamics...
Numerical methods for solving non-linear systems of hyperbolic conservation laws via finite volume m...
Owing to the complex processes involved, faithful prediction of high-velocity impact events demands ...
In this thesis we are interested in numerically solving conservation laws with high-order finite vol...
We propose a simple Cartesian method to simulate the interaction of compressible materials separated...
This paper is concerned with the numerical solution of the unified first order hyperbolic formulatio...
Over the past few decades, dynamic solid mechanics has become a major field of interest in industria...
The development of shock-capturing finite difference methods for hyperbolic conservation laws has be...
Owing to the complex processes involved, faithful prediction of high-velocity impact events demands ...
AbstractWe show how the partial differential equations governing elasticity can be written in fully ...
The Riemann problem is an important topic in the numerical simulation of compressible flows, aiding ...
The application of Riemann Methods formulated in the Lagrangian reference frame to the numerical sim...
Many problems in solid dynamics involve moving boundaries, finite elastoplastic deformations, and st...
AbstractIf variable boundary conditions are imposed on a stretched nonlinear elastic string, element...
An Eulerian, multi-material numerical method is described for computing dynamic problems involving l...
International audienceUnder the hypothesis of small deformations, the equations of 1D elastodynamics...
Numerical methods for solving non-linear systems of hyperbolic conservation laws via finite volume m...
Owing to the complex processes involved, faithful prediction of high-velocity impact events demands ...
In this thesis we are interested in numerically solving conservation laws with high-order finite vol...
We propose a simple Cartesian method to simulate the interaction of compressible materials separated...
This paper is concerned with the numerical solution of the unified first order hyperbolic formulatio...
Over the past few decades, dynamic solid mechanics has become a major field of interest in industria...
The development of shock-capturing finite difference methods for hyperbolic conservation laws has be...
Owing to the complex processes involved, faithful prediction of high-velocity impact events demands ...
AbstractWe show how the partial differential equations governing elasticity can be written in fully ...
The Riemann problem is an important topic in the numerical simulation of compressible flows, aiding ...