Continuity of attractors for a family of C1 perturbations of the square

Abstract

We consider here the family of semilinear parabolic problems equation* arrayrcl \ arrayrcl ut(x,t)&=& u(x,t) -au(x,t) + f(u(x,t)) ,\,\,\ x ∈ ε \,\,\,and\,\,\,\,\,\,t>0\,, \\ ∂ u∂ N(x,t)&=&g(u(x,t)), \,\, x ∈ ∂ε \,\,\,and\,\,\,\,\,\,t>0\,, array . array equation* where is the unit square, ε=hε() and hε is a family of diffeomorphisms converging to the identity in the C1-norm. We show that the problem is well posed for ε>0 sufficiently small in a suitable phase space, the associated semigroup has a global attractor Aε and the family \Aε\ is continuous at ε = 0.