Existence and Exponential Decay for a Kirchhoff–Carrier Model with Viscosity

This paper is concerned with the global existence and exponential stability of weak solutions in H 1 and H 2 for a real viscous heat-conducting flow with shear viscosity. Some known results have been extended and improved.

This paper deals with a class of nonlinear parabolic problems in divergence form whose solutions, without appropriate data restrictions, might blow up at some finite time. The purpose of this paper is to establish conditions on the data sufficient to guarantee blow-up of solution at some finite time

## Abstract This paper is concerned with the non‐linear viscoelastic equation We prove global existence of weak solutions. Furthermore, uniform decay rates of the energy are obtained assuming a strong damping Δ__u~t~__ acting in the domain and provided the relaxation function decays exponentially.

The paper considers a particular type of closed-loop for the wave equation in one space dimension with damping acting at an arbitrary internal point, for which the uniform stabilization with exponential decay rate is shown. Applications to chains of coupled strings are also discussed.