Evaluation-efficient multidimensional numerical integration
dc.contributor.advisor
Bull, Mark
en
dc.contributor.advisor
Peacock, John
en
dc.contributor.author
Tumolo, Greg Anthony
en
dc.date.accessioned
2019-11-26T14:35:39Z
dc.date.available
2019-11-26T14:35:39Z
dc.date.issued
2019-11-26
dc.description.abstract
Pre-existing methods for multidimensional numerical integration tend to use
many more evaluations of the integrand than necessary. That is, pre-existing
methods are evaluation inefficient. In some applications of multidimensional
numerical integration, such as cosmological model selection, each evaluation
is expensive. Consequently, multidimensional numerical integration by way
of any pre-existing method can be prohibitively expensive. An evaluationefficient
method for multidimensional numerical integration could enable such
applications.
Presented in this thesis is VoroInt (Voronoi Integrator), which is a novel
Monte Carlo method that uses a Voronoi decomposition of the integration
domain into regions about sample sites. The approximate integral returned
by the method is a Riemann sum of the value at each site weighted by the
size (that is, area, volume, or hyper-volume) of the Voronoi region that
contains the site. The error estimate returned by the method is the sum of,
for each region, the error estimate for the approximate integral over the
region. The error estimate for a region is the average deviation of the values
at the sites in the regions that are adjacent to the region from the value at the
site in the region times the size of the region. A similar formula in which the
average deviation is replaced by the absolute maximal deviation (because
the latter is more robust than the former) is used by the method to prioritize
each region for further sampling. Also presented are comparisons of the
number of evaluations used by and the accuracy of the values returned by
pre-existing methods and the novel method for various test integrands, which
show that the evaluation efficiency and the accuracy of the novel method are
better than those of pre-existing methods. The improvements come from the
effective sampling and error estimation by the method. Effective sampling
enables the method to efficiently find features of the integrand that
significantly contribute to the integral. Effective error estimation enables the
method to well estimate the accuracy of the approximate integral.
en
dc.identifier.uri
https://hdl.handle.net/1842/36533
dc.language.iso
en
dc.publisher
The University of Edinburgh
en
dc.subject
multidimensional numerical integration
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dc.subject
evaluation-efficiency
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dc.subject
Voronoi Integrator
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dc.subject
VoroInt
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dc.subject
integral of a multidimensional integrand
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dc.title
Evaluation-efficient multidimensional numerical integration
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dc.type
Thesis or Dissertation
en
dc.type.qualificationlevel
Doctoral
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dc.type.qualificationname
PhD Doctor of Philosophy
en
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