Stochastic modelling of symmetric positive definite material tensors
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Publication:6497246
DOI10.1016/J.JCP.2024.112883MaRDI QIDQ6497246
Hermann G. Matthies, Bojana V. Rosić, Sharana Kumar Shivanand
Publication date: 6 May 2024
Published in: Journal of Computational Physics (Search for Journal in Brave)
uncertainty quantificationhuman proximal femurdirectional and scaling uncertaintyspatial symmetries of ensemble and meanstochastic material modellingtensor-valued random variable
Stochastic analysis (60Hxx) Stochastic processes (60Gxx) Probabilistic methods, stochastic differential equations (65Cxx)
Cites Work
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- How to generate random matrices from the classical compact groups
- Efficient low-rank approximation of the stochastic Galerkin matrix in tensor formats
- Spectral expansions of homogeneous and isotropic tensor-valued random fields
- On the statistical dependence for the components of random elasticity tensors exhibiting material symmetry properties
- Sampling-free linear Bayesian update of polynomial chaos representations
- A deterministic filter for non-Gaussian Bayesian estimation -- Applications to dynamical system estimation with noisy measurements
- Geometric foundations for scaling-rotation statistics on symmetric positive definite matrices: minimal smooth scaling-rotation curves in low dimensions
- Stochastic systems. Uncertainty quantification and propagation
- Effective elasticity tensors in context of random errors
- Galerkin methods for linear and nonlinear elliptic stochastic partial differential equations
- Exponentials of skew-symmetric matrices and logarithms of orthogonal matrices
- Stochastic spectral methods for efficient Bayesian solution of inverse problems
- Non-Euclidean statistics for covariance matrices, with applications to diffusion tensor imaging
- Expansions for Gaussian processes and Parseval frames
- Spatial variation. 2nd ed
- Determination of the symmetries of an experimentally determined stiffness tensor: Application to acoustic measurements
- Representations of Gaussian random fields and approximation of elliptic PDEs with lognormal coefficients
- Riemannian geometric statistics in medical image analysis
- Geometric means
- Compactly supported correlation functions
- A random field formulation of Hooke's law in all elasticity classes
- Reduced model of macro-scale stochastic plasticity identification by Bayesian inference: application to quasi-brittle failure of concrete
- Bayesian identification and model comparison for random property fields derived from material microstructure
- Exploration of balanced metrics on symmetric positive definite matrices
- Is affine-invariance well defined on SPD matrices? A principled continuum of metrics
- Tucker tensor analysis of Matérn functions in spatial statistics
- Homogenization and porous media
- Non-Gaussian positive-definite matrix-valued random fields for elliptic stochastic partial differential operators
- Coordinate-free characterization of the symmetry classes of elasticity tensors
- Topics in Circular Statistics
- Microstructure Models and Material Response by Extreme Value Theory
- Continuum Mechanics of Anisotropic Materials
- Stochastic Model and Generator for Random Fields with Symmetry Properties: Application to the Mesoscopic Modeling of Elastic Random Media
- Inverse problems: A Bayesian perspective
- Matrix Information Geometry
- Non-Gaussian positive-definite matrix-valued random fields with constrained eigenvalues: Application to random elasticity tensors with uncertain material symmetries
- Generalized stochastic approach for constitutive equation in linear elasticity: a random matrix model
- An Introduction to Computational Stochastic PDEs
- On the Ando–Li–Mathias mean and the Karcher mean of positive definite matrices
- Symmetry and Physical Properties of Crystals
- Spectral Expansion of Three-Dimensional Elasticity Tensor Random Fields
- Sparse polynomial approximation of parametric elliptic PDEs. Part II: lognormal coefficients
- ON THE IDENTIFICATION OF MATERIAL SYMMETRY FOR ANISOTROPIC ELASTIC MATERIALS
- Stochastic finite elements: Computational approaches to stochastic partial differential equations
- Efficient Simulation of the von Mises Distribution
- Probability Theory
- Monte Carlo analysis of inverse problems
- Tensor-Valued Random Fields for Continuum Physics
- The Finite Element Method for Three‐Dimensional Thermomechanical Applications
- Inverse Problem Theory and Methods for Model Parameter Estimation
- Means and Averaging in the Group of Rotations
- Multilevel quasi-Monte Carlo integration with product weights for elliptic PDEs with lognormal coefficients
- Random field representations for stochastic elliptic boundary value problems and statistical inverse problems
- Stochastic elliptic operators defined by non-Gaussian random fields with uncertain spectrum
- Itô SDE--based Generator for a Class of Non-Gaussian Vector-valued Random Fields in Uncertainty Quantification
- Matérn Cross-Covariance Functions for Multivariate Random Fields
- Microstructural Randomness and Scaling in Mechanics of Materials
- A Differential Geometric Approach to the Geometric Mean of Symmetric Positive-Definite Matrices
- N-TERM WIENER CHAOS APPROXIMATION RATES FOR ELLIPTIC PDEs WITH LOGNORMAL GAUSSIAN RANDOM INPUTS
- Geometric Means in a Novel Vector Space Structure on Symmetric Positive‐Definite Matrices
- A Modern Introduction to Probability and Statistics
- Scaling-Rotation Distance and Interpolation of Symmetric Positive-Definite Matrices
- The Monte Carlo Method
- Introduction to Riemannian Geometry and Geometric Statistics: From Basic Theory to Implementation with Geomstats
- On the BCH-formula in \(\mathfrak{so}(3)\)
- Considerations on the identifiability of fracture and bond properties of reinforced concrete
- Lognormal Distributions and Geometric Averages of Symmetric Positive Definite Matrices
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