Accelerated Gibbs sampling of normal distributions using matrix splittings and polynomials

dc.contributor.authorFox, Colin
dc.contributor.authorParker, Albert E.
dc.date.accessioned2017-06-20T14:57:38Z
dc.date.available2017-06-20T14:57:38Z
dc.date.issued2017-11
dc.description.abstractStandard Gibbs sampling applied to a multivariate normal distribution with a specified precision matrix is equivalent in fundamental ways to the Gauss-Seidel iterative solution of linear equations in the precision matrix. Specifically, the iteration operators, the conditions under which convergence occurs, and geometric convergence factors (and rates) are identical. These results hold for arbitrary matrix splittings from classical iterative methods in numerical linear algebra giving easy access to mature results in that field, including existing convergence results for antithetic-variable Gibbs sampling, REGS sampling, and generalizations. Hence, efficient deterministic stationary relaxation schemes lead to efficient generalizations of Gibbs sampling. The technique of polynomial acceleration that significantly improves the convergence rate of an iterative solver derived from a symmetric matrix splitting may be applied to accelerate the equivalent generalized Gibbs sampler. Identicality of error polynomials guarantees convergence of the inhomogeneous Markov chain, while equality of convergence factors ensures that the optimal solver leads to the optimal sampler. Numerical examples are presented, including a Chebyshev accelerated SSOR Gibbs sampler applied to a stylized demonstration of low-level Bayesian image reconstruction in a large 3-dimensional linear inverse problem.en_US
dc.identifier.citationFox C, Parker AE, " Accelerated Gibbs sampling of normal distributions using matrix splittings and polynomials," Bernoulli; 2017 Nov; 23(4B):3711–43. doi: 10.3150/16-bej863en_US
dc.identifier.issn1350-7265
dc.identifier.urihttps://scholarworks.montana.edu/handle/1/13085
dc.titleAccelerated Gibbs sampling of normal distributions using matrix splittings and polynomialsen_US
dc.typeArticleen_US
mus.citation.extentfirstpage3711en_US
mus.citation.extentlastpage3743en_US
mus.citation.issue4Ben_US
mus.citation.journaltitleBernoullien_US
mus.citation.volume23en_US
mus.data.thumbpage4en_US
mus.identifier.categoryEngineering & Computer Scienceen_US
mus.identifier.categoryPhysics & Mathematicsen_US
mus.identifier.doi10.3150/16-bej863en_US
mus.relation.collegeCollege of Engineeringen_US
mus.relation.departmentCenter for Biofilm Engineering.en_US
mus.relation.departmentChemical & Biological Engineering.en_US
mus.relation.departmentMathematical Sciences.en_US
mus.relation.researchgroupCenter for Biofilm Engineering.en_US
mus.relation.universityMontana State University - Bozemanen_US

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