Maximal regularity for generalized boundary conditions in time

Abstract

We consider autonomous and non-autonomous evolution equations on a time interval [0,τ] in a Banach space X with the non-standard time-boundary condition u(0)= u(τ), where is a linear map on X. If =0, this is an initial value problem, whereas =I corresponds to periodic boundary conditions, and =-I to antiperiodic boundary conditions. Our main point is to establish maximal Lp-regularity. In the non-autonomous case we consider two situations. The first concerns time-dependent operators with a fixed domain. In the second one we take X=H a Hilbert space and consider evolution equations associated with non-autonomous forms. Of special interest is then maximal regularity in H with a non-standard time-boundary condition.