Weighted Korn’s Inequality for an Arbitrary Plate

## Abstract It is known that the classic Korn inequality is not valid for Hölder __α__ domains. In this paper, we prove a family of weaker inequalities for this kind of domains, replacing the standard __L^p^__‐norms by weighted norms where the weights are powers of the distance to the boundary. In

We introduce a new Kern's type inequality and show its usefulness in making the convergence of iterative algorithms for thin elastic structures independent of their thickness. ## Uno nouvelle i"egalitc de Kom pour de» structures Clasliqlles minces Resume. Nous introduisons une nouvelle inegalite

The dependence on the small parameter of constants in Korn's inequalities is investigated for domains which are obtained by joining thin rods to an elastic spatial body. The external ends of the rods are clamped. The asymptotic accuracy of the derived inequalities is achieved by certain distribution