A New Northcott Property for Faltings Height

Please use this identifier to cite or link to this item: http://arks.princeton.edu/ark:/88435/dsp011z40kw528

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DC Field	Value	Language
dc.contributor.advisor	Zhang, Shouwu	-
dc.contributor.author	Mocz, Lucia	-
dc.contributor.other	Mathematics Department	-
dc.date.accessioned	2018-06-12T17:39:59Z	-
dc.date.available	2018-06-12T17:39:59Z	-
dc.date.issued	2018	-
dc.identifier.uri	http://arks.princeton.edu/ark:/88435/dsp011z40kw528	-
dc.description.abstract	In this work we prove a new Northcott property for the Faltings height. Namely we show, assuming the Colmez Conjecture and the Artin Conjecture, that there are finitely many CM abelian varieties over the complex numbers of a fixed dimension which have bounded Faltings height. The technique developed uses new tools from integral p-adic Hodge theory to study the variation of Faltings height within an isogeny class of CM abelian varieties. In special cases, we are moreover able to use the technique to develop new Colmez-type formulas for the Faltings height.	-
dc.language.iso	en	-
dc.publisher	Princeton, NJ : Princeton University	-
dc.relation.isformatof	The Mudd Manuscript Library retains one bound copy of each dissertation. Search for these copies in the library's main catalog: <a href=http://catalog.princeton.edu> catalog.princeton.edu </a>	-
dc.subject	Arakelov Theory	-
dc.subject	Arithmetic Geometry	-
dc.subject	Faltings Height	-
dc.subject	Number Theory	-
dc.subject.classification	Mathematics	-
dc.title	A New Northcott Property for Faltings Height	-
dc.type	Academic dissertations (Ph.D.)	-
pu.projectgrantnumber	690-2143	-
Appears in Collections:	Mathematics

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