Obstructions to rational and integral points

Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018. === Cataloged from PDF version of thesis. === Includes bibliographical references (pages 143-149). === In this thesis, I study two examples of obstructions to rational and integral points on varieties. The first...

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Main Author: Corwin, David Alexander
Other Authors: Bjorn Poonen.
Format: Others
Language:English
Published: Massachusetts Institute of Technology 2018
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Online Access:http://hdl.handle.net/1721.1/117866
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spelling ndltd-MIT-oai-dspace.mit.edu-1721.1-1178662019-05-02T16:19:48Z Obstructions to rational and integral points Corwin, David Alexander Bjorn Poonen. Massachusetts Institute of Technology. Department of Mathematics. Massachusetts Institute of Technology. Department of Mathematics. Mathematics. Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018. Cataloged from PDF version of thesis. Includes bibliographical references (pages 143-149). In this thesis, I study two examples of obstructions to rational and integral points on varieties. The first concerns the S-unit equation, which asks for solutions to x + y = 1 with x and y both S-units, or units in Z = Z[1/S]. This is equivalent to finding the set of Z-points of P1 \ {0, 1, [infinity]}. We follow work of Dan-Cohen-Wewers and Brown in applying a motivic version of the non-abelian Chabauty's method of Minhyong Kim to find polynomials in p-adic polylogarithms that vanish on this set of integral points. More specifically, we extend the computations already done by Dan-Cohen-Wewers to the integer ring Z[1/3], and we provide some significant simplifications to a previous algorithm of Dan-Cohen, especially in the case of Z[1/S]. One of the reasons for doing this is to verify cases of Kim's conjecture, which states that these p-adic functions precisely cut out the set of integral points. This is joint work with Ishai Dan-Cohen. The second is about obstructions to the local-global principle. The étale Brauer-Manin obstruction of Skorobogatov can be used to explain the failure of the local-global principle for many algebraic varieties. In 2010, Poonen gave the first example of failure of the local-global principle that cannot be explained by the étale Brauer-Manin obstruction. Further obstructions such as the étale homotopy obstruction and the descent obstruction are unfortunately equivalent to the étale Brauer-Manin obstruction. However, Poonen's construction was not accompanied by a definition of a new, finer obstruction. Here, we present a possible definition for such an obstruction by applying the Brauer-Manin obstruction to each piece of every stratification of the variety. We prove that this obstruction is necessary and sufficient, over imaginary quadratic fields and totally real fields unconditionally, and over all number fields conditionally on the section conjecture. This is part of a joint project with Tomer Schlank. by David Alexander Corwin. Ph. D. 2018-09-17T15:47:43Z 2018-09-17T15:47:43Z 2018 2018 Thesis http://hdl.handle.net/1721.1/117866 1051190147 eng MIT theses are protected by copyright. They may be viewed, downloaded, or printed from this source but further reproduction or distribution in any format is prohibited without written permission. http://dspace.mit.edu/handle/1721.1/7582 149 pages application/pdf Massachusetts Institute of Technology
collection NDLTD
language English
format Others
sources NDLTD
topic Mathematics.
spellingShingle Mathematics.
Corwin, David Alexander
Obstructions to rational and integral points
description Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018. === Cataloged from PDF version of thesis. === Includes bibliographical references (pages 143-149). === In this thesis, I study two examples of obstructions to rational and integral points on varieties. The first concerns the S-unit equation, which asks for solutions to x + y = 1 with x and y both S-units, or units in Z = Z[1/S]. This is equivalent to finding the set of Z-points of P1 \ {0, 1, [infinity]}. We follow work of Dan-Cohen-Wewers and Brown in applying a motivic version of the non-abelian Chabauty's method of Minhyong Kim to find polynomials in p-adic polylogarithms that vanish on this set of integral points. More specifically, we extend the computations already done by Dan-Cohen-Wewers to the integer ring Z[1/3], and we provide some significant simplifications to a previous algorithm of Dan-Cohen, especially in the case of Z[1/S]. One of the reasons for doing this is to verify cases of Kim's conjecture, which states that these p-adic functions precisely cut out the set of integral points. This is joint work with Ishai Dan-Cohen. The second is about obstructions to the local-global principle. The étale Brauer-Manin obstruction of Skorobogatov can be used to explain the failure of the local-global principle for many algebraic varieties. In 2010, Poonen gave the first example of failure of the local-global principle that cannot be explained by the étale Brauer-Manin obstruction. Further obstructions such as the étale homotopy obstruction and the descent obstruction are unfortunately equivalent to the étale Brauer-Manin obstruction. However, Poonen's construction was not accompanied by a definition of a new, finer obstruction. Here, we present a possible definition for such an obstruction by applying the Brauer-Manin obstruction to each piece of every stratification of the variety. We prove that this obstruction is necessary and sufficient, over imaginary quadratic fields and totally real fields unconditionally, and over all number fields conditionally on the section conjecture. This is part of a joint project with Tomer Schlank. === by David Alexander Corwin. === Ph. D.
author2 Bjorn Poonen.
author_facet Bjorn Poonen.
Corwin, David Alexander
author Corwin, David Alexander
author_sort Corwin, David Alexander
title Obstructions to rational and integral points
title_short Obstructions to rational and integral points
title_full Obstructions to rational and integral points
title_fullStr Obstructions to rational and integral points
title_full_unstemmed Obstructions to rational and integral points
title_sort obstructions to rational and integral points
publisher Massachusetts Institute of Technology
publishDate 2018
url http://hdl.handle.net/1721.1/117866
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