On Poincar\'e, Friedrichs and Korns inequalities on domains and hypersurfaces

Abstract

The celebrated Poincar\'e and Friedrichs inequalities estimate the Lp-norm of a function by the Lp-norm of the gradient. We prove the Poincar\'e inequality for a domain ⊂ Rn and for a hypersurface C⊂Rn based on open mapping theorem of Banach only. For a cylinder which has a hypersurface as a base, is prove stronger inequality, involving only the surface derivatives. Similar inequalities for the uniform C-norm are proved as well. We also estimate Hmp-norm of functions prove inequalities for some generalizations of the mentioned inequalities. We also prove Poincar\'e-Korns and Friedrichs-Korns inequalities for vector-func\-ti\-ons estimating the Lp-norm of a function by the Lp-norm of the deformation tensor only on domains and on hypersurfaces. The proofs are based on the paper Du10 of the author on Korns inequalities. And again, the norm of the function in a cylinder is estimated by is the deformation tensor on the base of the cylinder.