Weighted non-autonomous Lq(Lp) maximal regularity for complex systems

Abstract

We show weighted non-autonomous Lq(Lp) maximal regularity for families of complex second-order systems in divergence form under a mixed regularity condition in space and time. To be more precise, we let p,q ∈ (1,∞) and we consider coefficient functions in Cβ + with values in Cα + subject to the parabolic relation 2β + α = 1. If p < dα, we can likewise deal with spatial Hα + , dα regularity. The starting point for this result is a weak (p,q)-solution theory with uniform constants. Further key ingredients are a commutator argument that allows us to establish higher a priori spatial regularity, operator-valued pseudo differential operators in weighted spaces, and a representation formula due to Acquistapace and Terreni. Furthermore, we show p-bounds for semigroups and square roots generated by complex elliptic systems under a minimal regularity assumption for the coefficients.