The uniform Korn - Poincar\'e inequality in thin domains

Abstract

We study the Korn-Poincar\'e inequality: \|u\|W1,2(Sh) < Ch \|D(u)\|L2(Sh), in domains Sh that are shells of small thickness of order h, around an arbitrary smooth and closed hypersurface S in Rn. By D(u) we denote the symmetric part of the gradient ∇ u, and we assume the tangential boundary conditions: u nh = 0 on ∂ Sh. We prove that Ch remains uniformly bounded as h tends to 0, for vector fields u in any family of cones (with angle <π/2, uniform in h) around the orthogonal complement of extensions of Killing vector fields on S. We also show that this condition is optimal, as in turn every Killing field admits a family of extensions uh, for which the ratio: \|uh\|W1,2(Sh) / \|D(uh)\|L2(Sh) blows up as h tends to 0, even if the domains Sh are not rotationally symmetric.