Ridged Domains, Embedding Theorems and Poincaré Inequalities

## 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

Using martingale techniques we will prove several deviation inequalities for diffusion processes in a compact Riemannian manifold and Le vy processes in euclidean space. We also deduce deviation inequalities from Poincare type inequalities in the abstract setting of Dirichlet forms. We thus obtain,

We first prove local versions of the Poincare inequality for solutions to the Á-harmonic equation. Then, as applications of the local results, we obtain the global versions of the Poincare inequality for solutions to the A-harmonic equation śŽ . s in L , 0 -averaging domains and L -averaging domains

In order to describe L 2 -convergence rates slower than exponential, the weak Poincare inequality is introduced. It is shown that the convergence rate of a Markov semigroup and the corresponding weak Poincare inequality can be determined by each other. Conditions for the weak Poincare inequality to