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Stability and canonical metrics on projective varieties

Descriptive

TitleInfo
Title
Stability and canonical metrics on projective varieties
Name (type = personal)
NamePart (type = family)
Lee
NamePart (type = given)
King Leung
NamePart (type = date)
1987-
DisplayForm
King Leung Lee
Role
RoleTerm (authority = RULIB)
author
Name (type = personal)
NamePart (type = family)
Sturm
NamePart (type = given)
Jacob
DisplayForm
Jacob Sturm
Affiliation
Advisory Committee
Role
RoleTerm (authority = RULIB)
chair
Name (type = personal)
NamePart (type = family)
Wang
NamePart (type = given)
Xiaowei
DisplayForm
Xiaowei Wang
Affiliation
Advisory Committee
Role
RoleTerm (authority = RULIB)
internal member
Name (type = personal)
NamePart (type = family)
Sczech
NamePart (type = given)
Robert
DisplayForm
Robert Sczech
Affiliation
Advisory Committee
Role
RoleTerm (authority = RULIB)
internal member
Name (type = personal)
NamePart (type = family)
McFeron
NamePart (type = given)
Donovan
DisplayForm
Donovan McFeron
Affiliation
Advisory Committee
Role
RoleTerm (authority = RULIB)
outside member
Name (type = corporate)
NamePart
Rutgers University
Role
RoleTerm (authority = RULIB)
degree grantor
Name (type = corporate)
NamePart
Graduate School - Newark
Role
RoleTerm (authority = RULIB)
school
TypeOfResource
Text
Genre (authority = marcgt)
theses
OriginInfo
DateCreated (qualifier = exact)
2018
DateOther (qualifier = exact); (type = degree)
2018-05
CopyrightDate (encoding = w3cdtf); (qualifier = exact)
2018
Place
PlaceTerm (type = code)
xx
Language
LanguageTerm (authority = ISO639-2b); (type = code)
eng
Abstract (type = abstract)
This thesis presents some of my works on projective geometry. The first part of this thesis provides some background based on the joint work with Li, Sturm, and Wang. The second part of this thesis will give a lower bound of the paired alpha invariant for polarized manifolds (X, L) and a fixed divisor D, which generalizes the results in Berman. The third part provides a simple proof of the equivalence relation between two different criteria on the existence of constant scalar curvature Kahler (cscK) metrics on toric manifolds.
Subject (authority = RUETD)
Topic
Mathematical Sciences
RelatedItem (type = host)
TitleInfo
Title
Rutgers University Electronic Theses and Dissertations
Identifier (type = RULIB)
ETD
Identifier
ETD_8899
PhysicalDescription
Form (authority = gmd)
electronic resource
InternetMediaType
application/pdf
InternetMediaType
text/xml
Extent
1 online resource (v, 130 p. : ill.)
Note (type = degree)
Ph.D.
Note (type = bibliography)
Includes bibliographical references
Subject (authority = ETD-LCSH)
Topic
Geometry, Algebraic
Subject (authority = ETD-LCSH)
Topic
Geometry, Projective
Note (type = statement of responsibility)
by King Leung Lee
RelatedItem (type = host)
TitleInfo
Title
Graduate School - Newark Electronic Theses and Dissertations
Identifier (type = local)
rucore10002600001
Location
PhysicalLocation (authority = marcorg); (displayLabel = Rutgers, The State University of New Jersey)
NjNbRU
Identifier (type = doi)
doi:10.7282/T33N26TK
Genre (authority = ExL-Esploro)
ETD doctoral
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Rights

RightsDeclaration (ID = rulibRdec0006)
The author owns the copyright to this work.
RightsHolder (type = personal)
Name
FamilyName
Lee
GivenName
King Leung
Role
Copyright Holder
RightsEvent
Type
Permission or license
DateTime (encoding = w3cdtf); (qualifier = exact); (point = start)
2018-04-13 18:43:30
AssociatedEntity
Name
King Leung Lee
Role
Copyright holder
Affiliation
Rutgers University. Graduate School - Newark
AssociatedObject
Type
License
Name
Author Agreement License
Detail
I hereby grant to the Rutgers University Libraries and to my school the non-exclusive right to archive, reproduce and distribute my thesis or dissertation, in whole or in part, and/or my abstract, in whole or in part, in and from an electronic format, subject to the release date subsequently stipulated in this submittal form and approved by my school. I represent and stipulate that the thesis or dissertation and its abstract are my original work, that they do not infringe or violate any rights of others, and that I make these grants as the sole owner of the rights to my thesis or dissertation and its abstract. I represent that I have obtained written permissions, when necessary, from the owner(s) of each third party copyrighted matter to be included in my thesis or dissertation and will supply copies of such upon request by my school. I acknowledge that RU ETD and my school will not distribute my thesis or dissertation or its abstract if, in their reasonable judgment, they believe all such rights have not been secured. I acknowledge that I retain ownership rights to the copyright of my work. I also retain the right to use all or part of this thesis or dissertation in future works, such as articles or books.
Copyright
Status
Copyright protected
Availability
Status
Open
Reason
Permission or license
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Technical

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DateCreated (point = end); (encoding = w3cdtf); (qualifier = exact)
2018-04-17T17:58:58
DateCreated (point = end); (encoding = w3cdtf); (qualifier = exact)
2018-04-17T17:58:58
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