AbstractWe prove local and global existence theorems for a model equation in nonlinear viscoelasticity. In contrast to previous studies, we allow the memory function to have a singularity. We approximate the equation by equations with regular kernels and use energy estimates to prove convergence of the approximate solutions
We treat the Cauchy problem for nonlinear system of viscoelasticity with memory term. We study the e...
AbstractWe study the global existence of solutions of initial-boundary-value problems for a quasilin...
We consider the Cauchy problem for incompressible viscoelastic fluids in the whole space $\mathbb{R}...
AbstractWe prove local and global existence theorems for a model equation in nonlinear viscoelastici...
AbstractThe initial-history value problem for the one-dimensional equation of viscoelasticity with f...
Problems in materials with memory are considered. In particular, the attention is focussed on the ke...
The existence and uniqueness of solution to a one-dimensional hyperbolic problem arising in viscoela...
Recent results, in [1-4], on viscoelasticy problems are considered in par- ticular referring to inte...
AbstractThe main purpose of this work is to study the damping effect of memory terms associated with...
Abstract In this paper the nonlinear viscoelastic wave equation in canonical form |ut|ρutt − ∆u − ∆u...
AbstractThe initial value problem for a nonlinear hyperbolic Volterra equation which models the moti...
International audienceWe provide a proof of global regularity of solutions of some models of viscoel...
AbstractWe study dissipative models for plates and we show that the solutions have a smoothing effec...
The existence and uniqueness of solution to a one-dimensional hyperbolic integro-differential proble...
We consider an integrodifferential equation equation arising in the theory of viscoelasticity. Her...
We treat the Cauchy problem for nonlinear system of viscoelasticity with memory term. We study the e...
AbstractWe study the global existence of solutions of initial-boundary-value problems for a quasilin...
We consider the Cauchy problem for incompressible viscoelastic fluids in the whole space $\mathbb{R}...
AbstractWe prove local and global existence theorems for a model equation in nonlinear viscoelastici...
AbstractThe initial-history value problem for the one-dimensional equation of viscoelasticity with f...
Problems in materials with memory are considered. In particular, the attention is focussed on the ke...
The existence and uniqueness of solution to a one-dimensional hyperbolic problem arising in viscoela...
Recent results, in [1-4], on viscoelasticy problems are considered in par- ticular referring to inte...
AbstractThe main purpose of this work is to study the damping effect of memory terms associated with...
Abstract In this paper the nonlinear viscoelastic wave equation in canonical form |ut|ρutt − ∆u − ∆u...
AbstractThe initial value problem for a nonlinear hyperbolic Volterra equation which models the moti...
International audienceWe provide a proof of global regularity of solutions of some models of viscoel...
AbstractWe study dissipative models for plates and we show that the solutions have a smoothing effec...
The existence and uniqueness of solution to a one-dimensional hyperbolic integro-differential proble...
We consider an integrodifferential equation equation arising in the theory of viscoelasticity. Her...
We treat the Cauchy problem for nonlinear system of viscoelasticity with memory term. We study the e...
AbstractWe study the global existence of solutions of initial-boundary-value problems for a quasilin...
We consider the Cauchy problem for incompressible viscoelastic fluids in the whole space $\mathbb{R}...