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Uniqueness for Continuous Superresolution by Means of Choquet Theory and Geometric Measure Theory.

Record Type:	Electronic resources : Monograph/item
Title/Author:	Uniqueness for Continuous Superresolution by Means of Choquet Theory and Geometric Measure Theory./
Author:	Cinoman, Ryan M.
Description:	1 online resource (120 pages)
Notes:	Source: Dissertations Abstracts International, Volume: 83-02, Section: B.
Contained By:	Dissertations Abstracts International83-02B.
Subject:	Mathematics. -
Online resource:	http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=28419123click for full text (PQDT)
ISBN:	9798534691016

Uniqueness for Continuous Superresolution by Means of Choquet Theory and Geometric Measure Theory.
Cinoman, Ryan M.

Uniqueness for Continuous Superresolution by Means of Choquet Theory and Geometric Measure Theory. - 1 online resource (120 pages)

Source: Dissertations Abstracts International, Volume: 83-02, Section: B.

Thesis (Ph.D.)--University of Maryland, College Park, 2021.

Includes bibliographical references

The problem of superresolution is to recover an element of a vector space from data much smaller than the dimension of the space, using a prior assumption of sparsity. A famous example is compressive sensing, where the elements are images with a large finite resolution. On the other hand, we focus on a continuous form of superresolution. Given a measure μ on a continuous domain such as the two dimensional torus, can we recover μ from knowledge of only a finite number of its Fourier coefficients using a total variation minimization method? We will see that the answer depends on certain properties of μ. Namely, a necessary condition is that μ be discrete.We use methods from geometric analysis to investigate the continuous superresolution problem. Tools from measure theory relate properties of the support of a measure, such as Hausdorff dimension, to properties of its Fourier transform. We also use measure theory to investigate the possibility of alternatives to total variation that may allow us to recover surface measures defined on space curves.There is a theorem of Choquet concerning representations of points in convex sets as sums of their extreme points. As it turns out, we can apply this to the superresolution problem because the extreme points of the set of measures with total variation 1 are precisely the set of delta measures. We consider superresolution as a convex optimization problem, where the goal is to find representations of the initial data as sums of delta measures. Choquet theory provides tools to investigate the previously unresolved problem of uniqueness. We use this to give a novel sufficient condition for a measure to be uniquely superresolved, given data on a known finite set of frequencies.

Electronic reproduction.
Ann Arbor, Mich. :
ProQuest,
2023

Mode of access: World Wide Web

ISBN: 9798534691016Subjects--Topical Terms:

515831
Mathematics.
Subjects--Index Terms:

Fourier AnalysisIndex Terms--Genre/Form:

542853
Electronic books.

Uniqueness for Continuous Superresolution by Means of Choquet Theory and Geometric Measure Theory.
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100 1 $a Cinoman, Ryan M. $3 3697729
245 1 0 $a Uniqueness for Continuous Superresolution by Means of Choquet Theory and Geometric Measure Theory.
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300 $a 1 online resource (120 pages)
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500 $a Source: Dissertations Abstracts International, Volume: 83-02, Section: B.
500 $a Advisor: Benedetto, John J.
502 $a Thesis (Ph.D.)--University of Maryland, College Park, 2021.
504 $a Includes bibliographical references
520 $a The problem of superresolution is to recover an element of a vector space from data much smaller than the dimension of the space, using a prior assumption of sparsity. A famous example is compressive sensing, where the elements are images with a large finite resolution. On the other hand, we focus on a continuous form of superresolution. Given a measure μ on a continuous domain such as the two dimensional torus, can we recover μ from knowledge of only a finite number of its Fourier coefficients using a total variation minimization method? We will see that the answer depends on certain properties of μ. Namely, a necessary condition is that μ be discrete.We use methods from geometric analysis to investigate the continuous superresolution problem. Tools from measure theory relate properties of the support of a measure, such as Hausdorff dimension, to properties of its Fourier transform. We also use measure theory to investigate the possibility of alternatives to total variation that may allow us to recover surface measures defined on space curves.There is a theorem of Choquet concerning representations of points in convex sets as sums of their extreme points. As it turns out, we can apply this to the superresolution problem because the extreme points of the set of measures with total variation 1 are precisely the set of delta measures. We consider superresolution as a convex optimization problem, where the goal is to find representations of the initial data as sums of delta measures. Choquet theory provides tools to investigate the previously unresolved problem of uniqueness. We use this to give a novel sufficient condition for a measure to be uniquely superresolved, given data on a known finite set of frequencies.
533 $a Electronic reproduction. $b Ann Arbor, Mich. : $c ProQuest, $d 2023
538 $a Mode of access: World Wide Web
650 4 $a Mathematics. $3 515831
650 4 $a Theoretical mathematics. $3 3173530
650 4 $a Applied mathematics. $3 2122814
650 4 $a Linear programming. $3 560448
650 4 $a Polynomials. $3 604754
650 4 $a Algorithms. $3 536374
650 4 $a Optimization. $3 891104
650 4 $a Signal processing. $3 533904
653 $a Fourier Analysis
653 $a Harmonic Analysis
653 $a Superresolution
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773 0 $t Dissertations Abstracts International $g 83-02B.
856 4 0 $u http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=28419123 $z click for full text (PQDT)