Parallel stochastic dynamic programming: finite element methods

Akstract--This paper investigates some of the design characteristics of explicit and implicit methods for parallel computers and suggests a hybrid approach which incorporates both methods. Several key issues are discussed as well as experiences in implementing all three methods. A range space/precon

## Abstract Delaunay triangulation is a geometric problem that is relatively difficult to parallelize. Parallel algorithms are usually characterized by considerable interprocessor communication or important serialized parts. In this paper, we propose a method that achieves high speed‐ups, but needs

The conventional finite element method dealing with stochastic problems is based on series expansion of stochastic quantities with respect to basic stochastic deviations, by means of either Taylor expansion, perturbation technique or Neumann expansion. The first-order approximation of the mean respo

## Abstract This paper focuses on the computation of statistical moments of strains and stresses in a random system model where uncertainty is modeled by a stochastic finite element method based on the polynomial chaos expansion. It identifies the cases where this objective can be achieved by analy