We construct a stable right inverse for the divergence operator in non-cylindrical domains in space-time. The domains are assumed to be Holder regular in space and evolve continuously in time.
The inverse operator is of Bogovskij type, meaning that it attains zero boundary values. We provide estimates in Sobolev spaces of positive and negative order with respect to both time and space variables.
The regularity estimates on the operator depend on the assumed Holder regularity of the domain. The results can naturally be connected to the known theory for Lipschitz domains.
The most precise estimates are given in weighted spaces, where the weight depends on the distance to the boundary. This allows for the deficit to be captured precisely in the vicinity of irregularities of the boundary.
As an application, we prove refined pressure estimates for weak and very weak solutions to Navier-Stokes equations in time dependent domains.