AbstractIf variable boundary conditions are imposed on a stretched nonlinear elastic string, elementary methods of solution fail, in general. If shocks develope, characteristic theory cannot be used after the shock forms. In the present note we examine the behaviour of the resultant wave motion using Godunov type numerical schemes with various Riemann solvers. Approximate Riemann solvers of the form suggested by Harten, Lax, and Van Leer [6] are compared with an exact solver. Up to the first breakdown time, the solutions may be compared to the solution obtained from characteristic theory
AbstractWe consider the mixed initial and boundary value problem of a hyperbolic 2-conservation law ...
The application of Riemann Methods formulated in the Lagrangian reference frame to the numerical sim...
International audienceUnder the hypothesis of small deformations, the equations of 1D elastodynamics...
Eulerian shock-capturing schemes have advantages for modelling problems involving complex non-linear...
AbstractWe consider a system modeling the dynamics of a nonlinear elastic string. This 6×6 system is...
AbstractThis paper concerns a non-linear system of wave equations describing the motion in space of ...
AbstractTwo methods for studying the evolution of discontinuities in solutions of nonlinear hyperbol...
Nonlinear waves on an infinite string with a rapid change in properties at one location are treated....
A new derivation of a wave equation for small vibrations of elastic strings fastened at ends varying...
The initial formulation of the evolution equation for the leading order approximation in nonlinear e...
A mathematical model for the small vibration of an elastic string is considered. The model takes int...
A common perspective on the numerical solution of the equation Euler equations for shock physics is ...
In order to elucidate some points in the linearised theory of waves on a string the exact equations ...
The traditional wave equation is mostly, if not always, obtained from a system of first order partia...
In the time dependent situations, the partial differential equations the most closely associated wi...
AbstractWe consider the mixed initial and boundary value problem of a hyperbolic 2-conservation law ...
The application of Riemann Methods formulated in the Lagrangian reference frame to the numerical sim...
International audienceUnder the hypothesis of small deformations, the equations of 1D elastodynamics...
Eulerian shock-capturing schemes have advantages for modelling problems involving complex non-linear...
AbstractWe consider a system modeling the dynamics of a nonlinear elastic string. This 6×6 system is...
AbstractThis paper concerns a non-linear system of wave equations describing the motion in space of ...
AbstractTwo methods for studying the evolution of discontinuities in solutions of nonlinear hyperbol...
Nonlinear waves on an infinite string with a rapid change in properties at one location are treated....
A new derivation of a wave equation for small vibrations of elastic strings fastened at ends varying...
The initial formulation of the evolution equation for the leading order approximation in nonlinear e...
A mathematical model for the small vibration of an elastic string is considered. The model takes int...
A common perspective on the numerical solution of the equation Euler equations for shock physics is ...
In order to elucidate some points in the linearised theory of waves on a string the exact equations ...
The traditional wave equation is mostly, if not always, obtained from a system of first order partia...
In the time dependent situations, the partial differential equations the most closely associated wi...
AbstractWe consider the mixed initial and boundary value problem of a hyperbolic 2-conservation law ...
The application of Riemann Methods formulated in the Lagrangian reference frame to the numerical sim...
International audienceUnder the hypothesis of small deformations, the equations of 1D elastodynamics...