Results 181 to 190 of about 943 (215)
Some of the next articles are maybe not open access.
Convergence of the Neumann Series in BEM for the Neumann Problem of the Stokes System
Acta Applicandae Mathematicae, 2011The boundary value problem to the Stokes system is considered in a bounded domain \(\Omega\subset\mathbb{R}^m\) with connected Lipschitz boundary \(\Gamma\) \[ \begin{cases} \Delta u-\nabla p=0,\quad \text{div}\,u=0&\text{in}\;\Omega,\\ \mathbb{T}(u,p)n=g &\text{on}\;\partial\Omega=\Gamma.
openaire +3 more sources
Symmetrization in neumann problems
Applicable Analysis, 1979Carla Maderna, Sandro Salsa, C. Pucci
openaire +1 more source
On the Von Neumann Economic Growth Problem
Mathematics of Operations Research, 1995We study the complexity of the von Neumann economic growth problem: [Formula: see text] where A and B are given two nonnegative and rational m × n-matrices, and A has no all-zero column. Let the binary data length of A and B be L. We develop an interior-point algorithm to generate a γ̄, such that γ* − 2−1 ≤ γ̄ ≤ γ*, in O((m + n)(L + min(m, n)t ...
openaire +2 more sources
The $$\overline{\partial }$$ -Neumann Problem
2010Here we study a boundary problem arising in the theory of functions of several complex variables. A function u on an open domain \(\Omega \subset {\mathbb{C}}^{n}\) is holomorphic if \(\bar{\partial }u = 0\), where $$\bar{\partial }u ={ \sum \limits_{j}} \frac{\partial u} {\partial \bar{{z}}_{j}}\ d\bar{{z}}_{j},$$ (0.1) with \(d\bar{{z}}_{j}
openaire +1 more source
THE NEUMANN PROBLEM AND PROBLEMS ON MANIFOLDS
2006Abstract This chapter completes the investigation of previous chapters on the Dirichlet and Cauchy problems by applying the techniques to other important problems. It selects two directions, the Neumann boundary conditions and the problems posed on manifolds.
openaire +1 more source
Uniqueness for the Neumann Problem
Journal of the London Mathematical Society, 1978openaire +1 more source
On a $$\boldsymbol{q}$$-Dirichlet–Neumann Problem with Discontinuity Conditions
Lobachevskii Journal of Mathematics, 2022T K Yuldashev, Yuldashev T K
exaly