Christoph Schwab
Title: Elliptic PDEs
with random field input -- numerical analysis of forward solvers and of
goal oriented input learning
Abstract:
Numerical Analysis of gPC FEM for elliptic PDEs in polygonal or
polyhedral domains with random field inputs is addressed; the input
data is assumed to be a random field that is represented as a
(nonlinear transformed) Karhunen Loeve expansion.
Assuming completely known inputs, we present a-priori analysis of the
complexity of the deterministic `forward' solve, in dependence on the
regularity of the spatial two-point correlation function of the input
data.
Adaptive selection of dimension and spectral order of active parameters
in the gPC representation of the random field solution of the PDE will
be addressed.
The Compressive Sampling of the input field with respect to the
response of the sPDE will be addressed.