ICIAM '87: Proceedings of the First International Conference on Industrial and Applied MathematicsJames McKenna, Roger Temam |
Contents
Welcome to ICIAM 87 | 3 |
Stochastic Control Theory | 31 |
Topology and Differential Equations | 45 |
Modeling and Numerical Analysis of Junctions Between Elastic Structures | 62 |
Mathematics Applied to a Major Industrial Problem | 75 |
What Is a Multivariate Spline? | 90 |
On a Duality Relation in the Theory of Orthogonal Polynomials and its Application | 102 |
A New Approach to Robust Multigrid Solvers | 114 |
Mathematics and Computing | 137 |
An Algorithmic View | 144 |
Numerical Analysis Scientific Computing Mathematical Theory | 153 |
Mathematics and Tomography | 183 |
Numerical Flow Simulation in Aerospace Industry | 200 |
A Review of Algorithms for Nonlinear Equations and Unconstrained Optimization | 220 |
367 | |
Model Driven Simulation Systems | 127 |
Common terms and phrases
2-D Euler acoustic adaptive algebraic algorithm applications applied mathematics approach approximation asymptotic B-splines bifurcation boundary conditions calculations Ciarlet Co-author combinatorial optimization complex computational convergence derivative described developed discrete discretisation discussed domain dynamics Ecole efficient Eigenvalue elastic elliptic estimates Euler equations example field Finite Element Finite Element Method fluid flow formulation France function geometry given graphs grid high Reynolds number ICIAM industrial Institute integral interaction inverse inviscid iteration lattice Linear Systems Math Mathematical Model matrix mesh minimization minisymposium multi-grid multivariate Navier-Stokes equations nonlinear numerical analysis obtained optimal control orthogonal polynomials parallel parameters partial differential equations physical presented programming Radon transform random Research schemes singular perturbations smooth solution solve solvers space spline stability stochastic structure techniques Technology theorem theory transform turbulent Universitat Universite Université Paris-Sud University value problems variables vector velocity vortex methods vortex sheet vorticity