On inequalities of Korn's type

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 first Korn's inequality is extended to unbounded domains and to classes of functions having a singular point. Let B be a regular domain of R 3 and let H(B) be the set of all vector-valued functions on B such that u = 0 on 0B and x7u is square summable over B. As is well-known, the first Korn's

Let ω be a domain in R 2 and let θ : ω → R 3 be a smooth immersion. The main purpose of this paper is to establish a "nonlinear Korn inequality on the surface θ (ω)", asserting that, under ad hoc assumptions, the H 1 (ω)-distance between the surface θ(ω) and a deformed surface is "controlled" by the