We study the mixed formulation of the stochastic Hodge-Laplace problem defined on an n-dimensional domain D (n≥ 1), with random forcing term. In particular, we focus on the magnetostatic problem and on the Darcy problem in the three-dimensional case. We derive and analyse the moment equations, that is, the deterministic equations solved by the mth moment (m≥ 1) of the unique stochastic solution of the stochastic problem. We find stable tensor product finite element discretizations, both full and sparse, and provide optimal order-of-convergence estimates. In particular, we prove the inf-sup condition for sparse tensor product finite element spaces.
Moment equations for the mixed formulation of the Hodge Laplacian with stochastic loading term
Bonizzoni F.;Nobile F.
2014-01-01
Abstract
We study the mixed formulation of the stochastic Hodge-Laplace problem defined on an n-dimensional domain D (n≥ 1), with random forcing term. In particular, we focus on the magnetostatic problem and on the Darcy problem in the three-dimensional case. We derive and analyse the moment equations, that is, the deterministic equations solved by the mth moment (m≥ 1) of the unique stochastic solution of the stochastic problem. We find stable tensor product finite element discretizations, both full and sparse, and provide optimal order-of-convergence estimates. In particular, we prove the inf-sup condition for sparse tensor product finite element spaces.| File | Dimensione | Formato | |
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