Maximal regularity for non-autonomous evolution equations

Abstract

We consider the maximal regularity problem for non-autonomous evolution equations of the form u(t) + A(t) u(t) = f(t) with initial data u(0) = u\0 . Each operator A(t) is associated with a sesquilinear form a(t; *, *) on a Hilbert space H . We assume that these forms all have the same domain and satisfy some regularity assumption with respect to t (e.g., piecewise α-H\"older continuous for some α 1/2). We prove maximal Lp-regularity for all initial values in the real-interpolation space (H, D(A(0)))\1/p,p . The particular case where p = 2 improves previously known results and gives a positive answer to a question of J.L. Lions [11] on the set of allowed initial data u\0 .