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MATHICSE Technical Report : On the dynamically orthogonal approximation of time dependent random PDEs

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Convergence of quasi-optimal Stochastic Galerkin methods for a class of PDES with random coefficients

Fabio Nobile, Lorenzo Tamellini

In this work we consider quasi-optimal versions of the Stochastic Galerkin method for solving linear elliptic PDEs with stochastic coefficients. In particular, we consider the case of a finite number

N

of random inputs and an analytic dependence of the s ...

2014

MATHICSE Technical Report : On the dynamically orthogonal approximation of time dependent random PDEs

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Chattez avec Graph Search

MATHICSE Technical Report : Multi-index stochastic collocation convergence rates for random PDEs with parametric regularity

Analysis and Computation of Hyperbolic PDEs with Random Data

Incentive Schemes for Participatory Sensing

Lyapunov exponents of random walks in small random potential: the upper bound

MATHICSE Technical Report : Optimization of mesh hierarchies in multilevel Monte Carlo samplers

Isogeometric Analysis of Electrophysiological Models on Surfaces

Convergence of quasi-optimal Stochastic Galerkin methods for a class of PDES with random coefficients

Accurate and efficient evaluation of failure probability for partial different equations with random input data

A Weighted Reduced Basis Method For Elliptic Partial Differential Equations With Random Input Data

MATHICSE Technical Report : Convergence of quasi-optimal stochastic Galerkin methods for a class of PDES with random coefficients

MATHICSE Technical Report : Multi-index stochastic collocation convergence rates for random PDEs with parametric regularity

Analysis and Computation of Hyperbolic PDEs with Random Data

MATHICSE Technical Report : Optimization of mesh hierarchies in multilevel Monte Carlo samplers

Incentive Schemes for Participatory Sensing

Isogeometric Analysis of Electrophysiological Models on Surfaces

Accurate and efficient evaluation of failure probability for partial different equations with random input data

A Weighted Reduced Basis Method For Elliptic Partial Differential Equations With Random Input Data

Lyapunov exponents of random walks in small random potential: the upper bound

Convergence of quasi-optimal Stochastic Galerkin methods for a class of PDES with random coefficients

MATHICSE Technical Report : Convergence of quasi-optimal stochastic Galerkin methods for a class of PDES with random coefficients