International audienceA macroscopic model describing nonlinear viscoelastic waves is derived in Eulerian formulation, through the introduction of relaxation tensors. It accounts for both constitutive and geometrical nonlinearities. In the case of small deformations, the governing equations recover those of the linear generalized Zener model (GZM) with memory variables, which is widely used in acoustics and seismology. The structure of the relaxation terms implies that the model is dissipative. The chosen family of specific internal energies ensures also that the model is unconditionally hyperbolic. A Godunov-type scheme with relaxation is implemented. A procedure for maintaining isochoric transformations at the discrete level is introduced....
International audienceA new hyperbolic softening model has been proposed for wave propagation in dam...
International audienceA macroscopic model describing elastic–plastic solids is derived in a special ...
International audienceThe dynamic response of a Zener viscoelastic medium in the frequency domain is...
A macroscopic model describing nonlinear viscoelastic waves is derived in Eulerian formulation, thro...
International audienceThis article concerns the numerical modeling of time-domain mechanical waves i...
We consider a multi-dimensional scalar wave equation with memory corresponding to the viscoelastic m...
AbstractNonlinear waves for a model of viscoelastic materials are constructed and analyzed. There ar...
This paper presents a rigorous procedure, based on the concepts of nonlinear continuum mechanics, to...
Recently, the classical wave equation has been generalized for the case of viscoelastic media descri...
Abstract - The description of wave propagation by a viscoelastic behaviour allows for the introducti...
Boundary integral equations are well suitable for the analysis of seismic waves propagation in unbou...
Zener’s model for viscoelastic solids replaces Hooke’s law σ = 2με(u) + λ tr(ε(u)) I, relating the s...
Zener’s model for viscoelastic solids replaces Hooke’s law σ = 2με(u) + λ tr(ε(u)) I, relating the s...
International audienceA new hyperbolic softening model has been proposed for wave propagation in dam...
International audienceA macroscopic model describing elastic–plastic solids is derived in a special ...
International audienceThe dynamic response of a Zener viscoelastic medium in the frequency domain is...
A macroscopic model describing nonlinear viscoelastic waves is derived in Eulerian formulation, thro...
International audienceThis article concerns the numerical modeling of time-domain mechanical waves i...
We consider a multi-dimensional scalar wave equation with memory corresponding to the viscoelastic m...
AbstractNonlinear waves for a model of viscoelastic materials are constructed and analyzed. There ar...
This paper presents a rigorous procedure, based on the concepts of nonlinear continuum mechanics, to...
Recently, the classical wave equation has been generalized for the case of viscoelastic media descri...
Abstract - The description of wave propagation by a viscoelastic behaviour allows for the introducti...
Boundary integral equations are well suitable for the analysis of seismic waves propagation in unbou...
Zener’s model for viscoelastic solids replaces Hooke’s law σ = 2με(u) + λ tr(ε(u)) I, relating the s...
Zener’s model for viscoelastic solids replaces Hooke’s law σ = 2με(u) + λ tr(ε(u)) I, relating the s...
International audienceA new hyperbolic softening model has been proposed for wave propagation in dam...
International audienceA macroscopic model describing elastic–plastic solids is derived in a special ...
International audienceThe dynamic response of a Zener viscoelastic medium in the frequency domain is...