Affine Springer fibers and the representation theory of small quantum groups and related algebras
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, May, 2020
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Format: | Thesis |
Language: | eng |
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Massachusetts Institute of Technology
2020
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Online Access: | https://hdl.handle.net/1721.1/126920 |
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author | Boixeda Alvarez, Pablo. |
author2 | Roman Bezrukavnikov. |
author_facet | Roman Bezrukavnikov. Boixeda Alvarez, Pablo. |
author_sort | Boixeda Alvarez, Pablo. |
collection | MIT |
description | Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, May, 2020 |
first_indexed | 2024-09-23T15:09:26Z |
format | Thesis |
id | mit-1721.1/126920 |
institution | Massachusetts Institute of Technology |
language | eng |
last_indexed | 2024-09-23T15:09:26Z |
publishDate | 2020 |
publisher | Massachusetts Institute of Technology |
record_format | dspace |
spelling | mit-1721.1/1269202020-09-04T03:09:52Z Affine Springer fibers and the representation theory of small quantum groups and related algebras Boixeda Alvarez, Pablo. Roman Bezrukavnikov. 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, May, 2020 Cataloged from the official PDF of thesis. Includes bibliographical references (pages 125-128). This thesis deals with the connections of Geometry and Representation Theory. In particular we study the representation theory of small quantum groups and Frobenius kernels and the geometry of an equivalued affine Springer fiber Fl[subscript ts] for s a regular semisimple element. In Chapter 2 we relate the center of the small quantum group with the cohomology of the above affine Springer fiber. This includes joint work with Bezrukavnikov, Shan and Vaserot. In Chapter 3 we study the geometry of the affine Springer fiber and in particular understand the fixed points of a torus action contained in each component. In Chapter 4 we further have a collection of algebraic results on the representation theory of Frobenius kernels. In particular we state some results pointing towards some construction of certain partial Verma functors and we compute this in the case of SL₂. We also compute the center of Frobenius kernels in the case of SL₂ and state a conjecture on a possible inductive construction of the general center. by Pablo Boixeda Alvarez. Ph. D. Ph.D. Massachusetts Institute of Technology, Department of Mathematics 2020-09-03T16:40:29Z 2020-09-03T16:40:29Z 2020 2020 Thesis https://hdl.handle.net/1721.1/126920 1191254281 eng MIT theses may be protected by copyright. Please reuse MIT thesis content according to the MIT Libraries Permissions Policy, which is available through the URL provided. http://dspace.mit.edu/handle/1721.1/7582 128 pages application/pdf Massachusetts Institute of Technology |
spellingShingle | Mathematics. Boixeda Alvarez, Pablo. Affine Springer fibers and the representation theory of small quantum groups and related algebras |
title | Affine Springer fibers and the representation theory of small quantum groups and related algebras |
title_full | Affine Springer fibers and the representation theory of small quantum groups and related algebras |
title_fullStr | Affine Springer fibers and the representation theory of small quantum groups and related algebras |
title_full_unstemmed | Affine Springer fibers and the representation theory of small quantum groups and related algebras |
title_short | Affine Springer fibers and the representation theory of small quantum groups and related algebras |
title_sort | affine springer fibers and the representation theory of small quantum groups and related algebras |
topic | Mathematics. |
url | https://hdl.handle.net/1721.1/126920 |
work_keys_str_mv | AT boixedaalvarezpablo affinespringerfibersandtherepresentationtheoryofsmallquantumgroupsandrelatedalgebras |