Localised necessary conditions for singularity formation in the Navier-Stokes equations with curved boundary

Abstract

We generalize two results in the Navier-Stokes regularity theory whose proofs rely on `zooming in' on a presumed singularity to the local setting near a curved portion ⊂ ∂ of the boundary. Suppose that u is a boundary suitable weak solution with singularity z* = (x*,T*), where x* ∈ . Then, under weak background assumptions, the L3 norm of u tends to infinity in every ball centered at x*: equation* t T*- u(·, t)L3( B(x*,r)) = ∞ ∀ r > 0. equation* Additionally, u generates a non-trivial `mild bounded ancient solution' in R3 or R3+ through a rescaling procedure that `zooms in' on the singularity. Our proofs rely on a truncation procedure for boundary suitable weak solutions. The former result is based on energy estimates for L3 initial data and a Liouville theorem. For the latter result, we apply perturbation theory for L∞ initial data based on linear estimates due to K. Abe and Y. Giga.