Interior Regularity of Solutions of the Tricomi Problem

For the Tricomi equation with Dirichlet boundary conditions, we study the relationship between singularites at the boundary and singularities in the interior of a bounded planar region with smooth non-characteristic boundary. Necessary and sufficient conditions for interior smoothness are stated in

## Abstract We consider some transmission problems for the Laplace operator in two‐dimensional domains. Our goal is to give minimal regularity of the solutions, better than __H__^1^, with or without conditions on the (positive) material constants. Under a monotonicity or quasi‐monotonicity conditio

We describe regularity results for viscosity solutions of a fully nonlinear (possible degenerate) second-order elliptic PDE with inhomogeneous Neumann boundary condition holding in the generalized sense. These results only require that 0 is uniformly convex, 0 # C 1, / for some / # (0, 1) and that t

## Abstract The interior __C__^0, γ^‐regularity for the first gradient of a weak solution to a class of nonlinear second order elliptic systems is proved under the assumption that oscillations of coefficients are controlled by the ellipticity constant. (© 2004 WILEY‐VCH Verlag GmbH & Co. KGaA, Wein

This paper describes explicitly all non-regular non-degenerate simplicial stochas-Ž tic Bernstein algebras. Consequently, the Bernstein problem S. N. Bernstein, Ž . . Science Ukraine 1 1992 , 14᎐19 in the non-degenerate case is settled, since the regular and exceptional cases have already been exami