Asymptotic behaviour of reaction–diffusion equations with non-damped impulsive effects

The existence of a global attractor in L 2 (Ω) is established for a reaction-diffusion equation on a bounded domain Ω in R d with Dirichlet boundary conditions, where the reaction term contains an operator F : L 2 (Ω) → L 2 (Ω) which is nonlocal and possibly nonlinear. Existence of weak solutions i

## Abstract We consider the Dirichlet problem for a non‐local reaction–diffusion equation with integral source term and local damping involving power non‐linearities. It is known from previous work that for subcritical damping, the blow‐up is global and the blow‐up profile is uniform on all compact

This paper deals with the appearance of monotone bounded travelling wave solutions for a parabolic reaction-diffusion equation which frequently meets both in chemical and biological systems. In particular, we prove the existence of monotone front type solutions for any wave speed c ≥ c \* and give a

## Abstract We consider a class of quasi‐linear evolution equations with non‐linear damping and source terms arising from the models of non‐linear viscoelasticity. By a Galerkin approximation scheme combined with the potential well method we prove that when __m__<__p__, where __m__(⩾0) and __p__ ar