Bayesian analysis of hierarchical random fields for material modeling

Abstract In probabilistic assessments, spatially variable material properties are modeled with random fields. These random fields can be learned from spatial data by means of Bayesian analysis. This paper presents analytical expressions for the Bayesian analysis of hierarchical Gaussian random fields. We model the prior spatial distribution by a Gaussian random field with normal-gamma distributed mean and precision and make use of the conjugacy of prior distribution and likelihood function to find the posterior distribution of the random field parameters. We present closed-form expressions for the spatial mean and precision function of the posterior predictive Student’s t -random field. Furthermore, we discuss the application of the hierarchical model to non-Gaussian random fields (translation random fields) and show the connection of the methodology to the Bayesian approachof EN 1990 for estimating characteristic values for material parameters. The method is illustrated on two spatial data sets of concrete and soil strength parameters.

[1]  Yu Wang,et al.  Direct simulation of random field samples from sparsely measured geotechnical data with consideration of uncertainty in interpretation , 2018, Canadian Geotechnical Journal.

[2]  Iason Papaioannou,et al.  Bayesian updating of slope reliability in spatially variable soils with in-situ measurements , 2018 .

[3]  Yu Wang,et al.  Statistical interpretation of soil property profiles from sparse data using Bayesian compressive sampling , 2017 .

[4]  Rüdiger Rackwitz Predictive distribution of strength under control , 1983 .

[5]  Iason Papaioannou,et al.  Bayesian Updating with Structural Reliability Methods , 2015 .

[6]  M. Grigoriu Crossings of non-gaussian translation processes , 1984 .

[7]  Sudipto Banerjee,et al.  Modeling Massive Spatial Datasets Using a Conjugate Bayesian Linear Regression Framework , 2021, ArXiv.

[8]  Jianye Ching,et al.  Application of the transitional Markov chain Monte Carlo algorithm to probabilistic site characterization , 2016 .

[9]  Gilberto A. Paula,et al.  Log-symmetric distributions: Statistical properties and parameter estimation , 2016 .

[10]  Iason Papaioannou,et al.  Reliability assessment of large hydraulic structures with spatially distributed measurements , 2020, Structure and Infrastructure Engineering.

[11]  A. Kiureghian,et al.  Multivariate distribution models with prescribed marginals and covariances , 1986 .

[12]  M. Stein,et al.  A Bayesian analysis of kriging , 1993 .

[13]  Kok-Kwang Phoon,et al.  Simulation of non-stationary non-Gaussian random fields from sparse measurements using Bayesian compressive sampling and Karhunen-Loève expansion , 2019, Structural Safety.

[14]  Jörg Bödefeld,et al.  Erhaltung und Instandsetzung von Massiven Verkehrswasserbauwerken , 2015 .

[15]  Yu Wang,et al.  Direct simulation of two-dimensional isotropic or anisotropic random field from sparse measurement using Bayesian compressive sampling , 2019, Stochastic Environmental Research and Risk Assessment.

[16]  E. Vanmarcke Probabilistic Modeling of Soil Profiles , 1977 .

[17]  Log Student’s t-distribution-based option sensitivities: Greeks for the Gosset formulae , 2010, 1003.1344.

[18]  Sudipto Banerjee,et al.  Modeling Massive Spatial Datasets Using a Conjugate Bayesian Linear Regression Framework , 2020, Spatial statistics.

[19]  A. Kiureghian,et al.  OPTIMAL DISCRETIZATION OF RANDOM FIELDS , 1993 .

[20]  Samuel Kotz,et al.  Multivariate T-Distributions and Their Applications , 2004 .

[21]  K. Phoon,et al.  Characterization of Geotechnical Variability , 1999 .

[22]  Li Min Zhang,et al.  Characterizing geotechnical anisotropic spatial variations using random field theory , 2013 .

[23]  J. Ching,et al.  Transitional Markov Chain Monte Carlo Method for Bayesian Model Updating, Model Class Selection, and Model Averaging , 2007 .

[24]  Kok-Kwang Phoon,et al.  3D Probabilistic Site Characterization by Sparse Bayesian Learning , 2020 .

[25]  Yu Wang,et al.  Simulation of cross-correlated random field samples from sparse measurements using Bayesian compressive sensing , 2018, Mechanical Systems and Signal Processing.

[26]  Kok-Kwang Phoon,et al.  Dealing with Nonlattice Data in Three-Dimensional Probabilistic Site Characterization , 2021 .

[27]  Iason Papaioannou,et al.  Learning soil parameters and updating geotechnical reliability estimates under spatial variability – theory and application to shallow foundations , 2017 .

[28]  Iason Papaioannou,et al.  Bayesian inference with Subset Simulation: Strategies and improvements , 2018 .

[29]  Daniel T. Cassidy,et al.  Pricing European options with a log Students t-distribution: A Gosset formula , 2009, 0906.4092.

[30]  Kok-Kwang Phoon,et al.  Characterizing Uncertain Site-Specific Trend Function by Sparse Bayesian Learning , 2017 .

[31]  I. Papaioannou,et al.  Bayesian identification and model comparison for random property fields derived from material microstructure , 2020, Computer Methods in Applied Mechanics and Engineering.

[32]  Erik H. Vanmarcke,et al.  Random Fields: Analysis and Synthesis. , 1985 .

[33]  Kok-Kwang Phoon,et al.  Identification of statistically homogeneous soil layers using modified Bartlett statistics , 2003 .

[34]  P. Moral,et al.  Sequential Monte Carlo samplers , 2002, cond-mat/0212648.

[35]  Iason Papaioannou,et al.  Bayesian inference of random fields represented with the Karhunen–Loève expansion , 2020 .

[36]  Yu Wang,et al.  Bayesian perspective on geotechnical variability and site characterization , 2016 .

[37]  S. Lacasse,et al.  Scale of Fluctuation for Geotechnical Probabilistic Analysis , 2015 .

[38]  Tao Zhang,et al.  A tutorial review of reactive transport modeling and risk assessment for geologic CO2 sequestration , 2019, Comput. Geosci..

[39]  K. Phoon,et al.  Simulation of Random Fields with Trend from Sparse Measurements without Detrending , 2019, Journal of Engineering Mechanics.

[40]  Ove Ditlevsen,et al.  Bayesian soil assessments combining prior with posterior censored samples , 2000 .