Navier-Stokes Equations: Theory and Numerical AnalysisNorth-Holland, 1984 - 526 ページ This third revised edition contains an expanded bibliography and has been brought up to date with reviews of recent progress. |
目次
The SteadyState Stokes Equations | 1 |
2 Existence and uniqueness for the Stokes equations 2 2227 3 | 20 |
3 Discretization of the Stokes equations | 39 |
著作権 | |
他の 17 セクションは表示されていません
他の版 - すべて表示
多く使われている語句
algorithm APX1 b₁ barycentric coordinates belongs boundary bounded set c₁ Chapter compactness theorem condition Const constant continuous curl d₁ d₂ defined denote discrete equal existence and uniqueness external approximation finite element methods finite elements fluid given grad hence Hilbert space Hölder inequality inequality integrate L²(N L²(Q linear Lipschitz method Navier-Stokes equations nonlinear norm numerical obtain open set Poincaré inequality polynomial of degree priori estimates Problem 3.1 proof of Lemma proof of Theorem Proposition prove regularity Remark right-hand side satisfies scalar product Schemes 5.1 Section sequence Sobolev inequalities solution of Problem stability step function Stokes problem strongly Temam Theorem 3.1 triangle u₁ u₂ um+1 v₁ vector functions w₁ weak topology weakly X₁ Σ Σ