Abstract
Finite dimensional (FD) models, i.e., deterministic functions of space depending on finite sets of random variables, are used extensively in applications to generate samples of random fields Z ( x ) Z(x) and construct approximations of solutions U ( x ) U(x) of ordinary or partial differential equations whose random coefficients depend on Z ( x ) Z(x) . FD models of Z ( x ) Z(x) and U ( x ) U(x) constitute surrogates of these random fields which target various properties, e.g., mean/correlation functions or sample properties. We establish conditions under which samples of FD models can be used as substitutes for samples of Z ( x ) Z(x) and U ( x ) U(x) for two types of random fields Z ( x ) Z(x) and a simple stochastic equation. Some of these conditions are illustrated by numerical examples.
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