Uniform approximation of non-autonomous evolution equations

Abstract

We study L2-maximal regularity for non-autonomous evolution equations of the form equationAbstract equation u(t)+ A(t)u(t)=f(t)\ \ t∈[0,T],\ \ u(0)=u0. equation where A(t),\ t∈ [0,T] arise from a non-autonomous sesquilinear forms a(t,·,·) on a Hilbert space H with constant domain V⊂ H. L2-maximal regularity result is proved recently in Ar-Mo15 when a is H\"older continuous of type α>1/2. In this paper we recover the same results by an approximation method developed in ELLA13, LASA14 and ELLA15. The method uses an appropriate approximation A(·) of A(·) for which equationAbstract equation approx u(t)+ A(t)u(t)=f(t)\ \ t∈[0,T],\ \ u(0)=u0 equation has L2-maximal regularity where is a subdivision of [0,T]. Moreover, under a little more assumptions on the modulus of continuity we show that the solutions of (Abstract equation approx) converges in L2(0,T,V) H1(0,T,H) C(0,T,V) uniformly on the initial datas (u0,f) to the solution of (Abstract equation) as || → 0.