On Overdetermined Boundary Value Problems for the Biharmonic Operator

## Communicated by W. Spro¨ßig In this paper, we study a system of biharmonic equations coupled by the boundary conditions. These boundary conditions contain some combinations of the values, div, curl, and grad. Applications in mathematical physics are possible and the investigations will be done

We consider different types of singular boundary value problems for the Monge᎐Ampere operator. The approach is based on existing regularity theory and á subsolution᎐supersolution method. Nonexistence and uniqueness results are also given.

## Abstract We explore the extent to which basic differential operators (such as Laplace–Beltrami, Lamé, Navier–Stokes, etc.) and boundary value problems on a hypersurface 𝒮 in ℝ^__n__^ can be expressed globally, in terms of the standard spatial coordinates in ℝ^__n__^ . The approach we develop al

Strong solvability in the Sobolev space W 2 p is proved for the oblique derivative problem almost everywhere in ∂u/∂ + σ x u = ϕ x in the trace sense on ∂ in the case when the vector field x has a contact of infinite order with ∂ at the points of some non-empty subset E ⊂ ∂ .