Reaction-diffusion systems governed by non-autonomous forms (Q1704546)

The authors are concerned with the equation \[ u'(t)+{\mathcal A}(t)u(t)=f(u(t))\quad\text{ for a.e. }t\in (0,T) \] and \(u(0)=u_0\). Here \({\mathcal A}(t)\) is associated with a non-autonomous form \(a(t,\cdot,\cdot)\). The main goal of the authors is to study the global solutions which is deduced by employing an invariance principle for closed, convex sets in the underlying Hilbert space. Such an approach is further applied to reaction diffusion systems in \(L^2(\Omega)^N\).