Modes of Gaussian Mixtures and an Inequality for the Distance Between Curves in Space

<p>This dissertation studiess high dimensional problems from a low dimensional perspective. First, we explore rectifiable curves in high-dimensional space by using the Fréchet distance between and total curvatures of the two curves to bound the difference of their lengths. We create this boun...

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Main Author: Fasy, Brittany Terese
Other Authors: Edelsbrunner, Herbert
Published: 2012
Subjects:
Online Access:http://hdl.handle.net/10161/5793
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spelling ndltd-DUKE-oai-dukespace.lib.duke.edu-10161-57932013-01-07T20:08:12ZModes of Gaussian Mixtures and an Inequality for the Distance Between Curves in SpaceFasy, Brittany TereseComputer science<p>This dissertation studiess high dimensional problems from a low dimensional perspective. First, we explore rectifiable curves in high-dimensional space by using the Fréchet distance between and total curvatures of the two curves to bound the difference of their lengths. We create this bound by mapping the curves into R^2 while preserving the length between the curves and increasing neither</p><p>the total curvature of the curves nor the Fr\'echet distance between them. The bound is independent of the dimension of the ambient Euclidean space, it improves upon a bound by Cohen-Steiner and Edelsbrunner for dimensions greater than three and it generalizes</p><p>a result by F\'ary and Chakerian.</p><p>In the second half of the dissertation, we analyze Gaussian mixtures. In particular, we consider the sum of n Gaussians, where each Gaussian is centered at the vertex of a regular n-simplex. Fixing the width of the Guassians and varying the diameter of the simplex from zero to infinity by increasing a parameter that we call the scale factor, we find the window of scale factors for which the Gaussian mixture has more modes, or local maxima, than components of the mixture.</p><p>We see that the extra mode created is subtle, but can be higher than the modes closer to the vertices of the simplex. In addition, we prove that all critical points are located on a set of one-dimensional lines (axes) connecting barycenters of complementary faces of</p><p>the simplex.</p>DissertationEdelsbrunner, Herbert2012Dissertationhttp://hdl.handle.net/10161/5793
collection NDLTD
sources NDLTD
topic Computer science
spellingShingle Computer science
Fasy, Brittany Terese
Modes of Gaussian Mixtures and an Inequality for the Distance Between Curves in Space
description <p>This dissertation studiess high dimensional problems from a low dimensional perspective. First, we explore rectifiable curves in high-dimensional space by using the Fréchet distance between and total curvatures of the two curves to bound the difference of their lengths. We create this bound by mapping the curves into R^2 while preserving the length between the curves and increasing neither</p><p>the total curvature of the curves nor the Fr\'echet distance between them. The bound is independent of the dimension of the ambient Euclidean space, it improves upon a bound by Cohen-Steiner and Edelsbrunner for dimensions greater than three and it generalizes</p><p>a result by F\'ary and Chakerian.</p><p>In the second half of the dissertation, we analyze Gaussian mixtures. In particular, we consider the sum of n Gaussians, where each Gaussian is centered at the vertex of a regular n-simplex. Fixing the width of the Guassians and varying the diameter of the simplex from zero to infinity by increasing a parameter that we call the scale factor, we find the window of scale factors for which the Gaussian mixture has more modes, or local maxima, than components of the mixture.</p><p>We see that the extra mode created is subtle, but can be higher than the modes closer to the vertices of the simplex. In addition, we prove that all critical points are located on a set of one-dimensional lines (axes) connecting barycenters of complementary faces of</p><p>the simplex.</p> === Dissertation
author2 Edelsbrunner, Herbert
author_facet Edelsbrunner, Herbert
Fasy, Brittany Terese
author Fasy, Brittany Terese
author_sort Fasy, Brittany Terese
title Modes of Gaussian Mixtures and an Inequality for the Distance Between Curves in Space
title_short Modes of Gaussian Mixtures and an Inequality for the Distance Between Curves in Space
title_full Modes of Gaussian Mixtures and an Inequality for the Distance Between Curves in Space
title_fullStr Modes of Gaussian Mixtures and an Inequality for the Distance Between Curves in Space
title_full_unstemmed Modes of Gaussian Mixtures and an Inequality for the Distance Between Curves in Space
title_sort modes of gaussian mixtures and an inequality for the distance between curves in space
publishDate 2012
url http://hdl.handle.net/10161/5793
work_keys_str_mv AT fasybrittanyterese modesofgaussianmixturesandaninequalityforthedistancebetweencurvesinspace
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