Quantification of Airfoil Geometry-Induced Aerodynamic Uncertainties---Comparison of Approaches
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Publication:5269866
DOI10.1137/15M1050239WikidataQ57524771 ScholiaQ57524771MaRDI QIDQ5269866
Alexander Litvinenko, Claudia Schillings, Dishi Liu, Volker H. Schulz
Publication date: 28 June 2017
Published in: SIAM/ASA Journal on Uncertainty Quantification (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1505.05731
numerical integrationsurrogate modelingaerodynamic simulationairfoil geometric uncertaintygradient-enhanced kriging
Numerical interpolation (65D05) Numerical quadrature and cubature formulas (65D32) Numerical integration (65D30)
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Uses Software
Cites Work
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- Constructing Sobol Sequences with Better Two-Dimensional Projections
- Uncertainty quantification in computational fluid dynamics
- A new level-set based approach to shape and topology optimization under geometric uncertainty
- An adaptive stochastic finite elements approach based on Newton-Cotes quadrature in simplex elements
- Asymptotic behavior of the likelihood function of covariance matrices of spatial Gaussian processes
- Application of hierarchical matrices for computing the Karhunen-Loève expansion
- Error estimates and condition numbers for radial basis function interpolation
- High dimensional polynomial interpolation on sparse grids
- On the influence of robustness measures on shape optimization with stochastic uncertainties
- Aerodynamic shape design using evolutionary algorithms and new gradient-assisted metamodels
- Hybrid evolutionary algorithm with Hermite radial basis function interpolants for computationally expensive adjoint solvers
- Sampling and Low-Rank Tensor Approximation of the Response Surface
- Sparse grids-based stochastic approximations with applications to aerodynamics sensitivity analysis
- Probabilistic collocation used in a Two-Step approached for efficient uncertainty quantification in computational fluid dynamics
- Polynomial Chaos Expansion of Random Coefficients and the Solution of Stochastic Partial Differential Equations in the Tensor Train Format
- Spectral Methods for Uncertainty Quantification
- Quasi-Monte Carlo Methods for Numerical Integration: Comparison of Different Low Discrepancy Sequences
- To Be or Not to Be Intrusive? The Solution of Parametric and Stochastic Equations---the “Plain Vanilla” Galerkin Case
- Random Fields and Geometry
- Sensitivity of two-dimensional spatially developing mixing layers with respect to uncertain inflow conditions
- Algorithmic Developments in TAU
- Scattered Data Approximation
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