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Multi-Variable Period Polynomials As...

Gjoneski, Oliver.

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Multi-Variable Period Polynomials Associated to Cusp Forms.

Record Type:	Language materials, printed : Monograph/item
Title/Author:	Multi-Variable Period Polynomials Associated to Cusp Forms./
Author:	Gjoneski, Oliver.
Description:	140 p.
Notes:	Source: Dissertation Abstracts International, Volume: 72-07, Section: B, page: .
Contained By:	Dissertation Abstracts International72-07B.
Subject:	Applied Mathematics. -
Online resource:	http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=3452996
ISBN:	9781124608457

Multi-Variable Period Polynomials Associated to Cusp Forms.
Gjoneski, Oliver.

Multi-Variable Period Polynomials Associated to Cusp Forms. - 140 p.

Source: Dissertation Abstracts International, Volume: 72-07, Section: B, page: .

Thesis (Ph.D.)--Duke University, 2011.

My research centers on the cohomology of arithmetic varieties. More specifically, I am interested in applying analytical, as well as topological methods to gain better insight into the cohomology of certain locally symmetric spaces. An area of research where the intersection of these analytical and algebraic tools has historically been very effective, is the classical theory of modular symbols associated to cusp forms. In this context, my research can be seen as developing a framework in which to compute modular symbols in higher rank.

ISBN: 9781124608457Subjects--Topical Terms:

1669109
Applied Mathematics.

Multi-Variable Period Polynomials Associated to Cusp Forms.
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100 1 $a Gjoneski, Oliver. $3 1684278
245 1 0 $a Multi-Variable Period Polynomials Associated to Cusp Forms.
300 $a 140 p.
500 $a Source: Dissertation Abstracts International, Volume: 72-07, Section: B, page: .
500 $a Adviser: Leslie D. Saper.
502 $a Thesis (Ph.D.)--Duke University, 2011.
520 $a My research centers on the cohomology of arithmetic varieties. More specifically, I am interested in applying analytical, as well as topological methods to gain better insight into the cohomology of certain locally symmetric spaces. An area of research where the intersection of these analytical and algebraic tools has historically been very effective, is the classical theory of modular symbols associated to cusp forms. In this context, my research can be seen as developing a framework in which to compute modular symbols in higher rank.
520 $a An important tool in my research is the well-rounded retract for GLn: In particular, in order to study the cohomology of the locally symmetric space associated to GL3 more effectively I designed an explicit, combinatorial contraction of the well-rounded retract. When combined with the suitable cell-generating procedure, this contraction yields new results pertinent to the notion of modular symbol I am researching in my thesis.
590 $a School code: 0066.
650 4 $a Applied Mathematics. $3 1669109
650 4 $a Mathematics. $3 515831
690 $a 0364
690 $a 0405
710 2 $a Duke University. $b Mathematics. $3 1036449
773 0 $t Dissertation Abstracts International $g 72-07B.
790 1 0 $a Saper, Leslie D., $e advisor
790 1 0 $a Saper, Leslie D. $e committee member
790 1 0 $a Hain, Richard M. $e committee member
790 1 0 $a Pardon, William L. $e committee member
790 1 0 $a Stern, Mark A. $e committee member
790 $a 0066
791 $a Ph.D.
792 $a 2011
856 4 0 $u http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=3452996