Junior Geometry and Topology Seminar
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Thu, 21/01/2010 13:30 |
Steven Rayan (Oxford) |
Junior Geometry and Topology Seminar  |
SR1 |
| PLEASE NOTE THE CHANGE OF TIME FOR THIS WEEK: 13.30 instead of 12. In the first of two talks, I will simultaneously introduce the notion of a co-Higgs vector bundle and the notion of the spectral curve associated to a compact Riemann surface equipped with a vector bundle and some extra data. I will try to put these ideas into both a historical context and a contemporary one. As we delve deeper, the emphasis will be on using spectral curves to better understand a particular moduli space. | |||
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Thu, 28/01/2010 13:15 |
Steven Rayan (Oxford) |
Junior Geometry and Topology Seminar |
SR1 |
| After reviewing the salient details from last week's seminar, I will construct an explicit example of a spectral curve, using co-Higgs bundles of rank 2. The role of the spectral curve in understanding the moduli space will be made clear by appealing to the Hitchin fibration, and from there inferences (some of them very concrete) can be made about the structure of the moduli space. I will make some conjectures about the higher-dimensional picture, and also try to show how spectral varieties might live in that picture. | |||
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Thu, 04/02/2010 12:00 |
Imran Qureshi (Oxford) |
Junior Geometry and Topology Seminar |
SR1 |
Many interesting classes of projective varieties can be studied in terms of their graded rings. For weighted projective varieties, this has been done in the past in relatively low codimension.
Let  be a simple and simply connected Lie group and  be a parabolic subgroup of , then homogeneous space  is a projective subvariety of  for some-representation  . I will describe weighted projective analogues of these spaces and give the corresponding Hilbert series formula for this construction. I will also show how one may use such spaces as ambient spaces to construct weighted projective varieties of higher codimension. |
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Thu, 04/02/2010 14:00 |
Jorge Vitoria (Warwick) |
Junior Geometry and Topology Seminar |
SR2 |
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Thu, 04/02/2010 15:45 |
Yuhi Sekiya (Nagoya/Glasgow) |
Junior Geometry and Topology Seminar |
DH 2nd floor SR |
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Thu, 11/02/2010 12:00 |
Hwasung Mars Lee (Oxford) |
Junior Geometry and Topology Seminar |
SR1 |
| We will present a physical motivation of the SYZ conjecture and try to understand the conjecture via calibrated geometry. We will define calibrated submanifolds, and also give sketch proofs of some properties of the moduli space of special Lagrangian submanifolds. The talk will be elementary and accessible to a broad audience. | |||
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Thu, 18/02/2010 12:00 |
Laura Schaposnik (Oxford) |
Junior Geometry and Topology Seminar |
SR1 |
| We will consider the monodromy action on mod 2 cohomology for SL(2) Hitchin systems. We will study Copeland's approach to the subject and use his results to compute the monodromy action on mod 2 cohomology. An interpretation of our results in terms of geometric properties of fixed points of a natural involution on the moduli space is given. | |||
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Thu, 25/02/2010 12:00 |
Jessica Banks (Oxford) |
Junior Geometry and Topology Seminar |
SR1 |
In 2008, Juhasz published the following result, which was proved using sutured Floer homology.
Let  be a prime, alternating knot. Let  be the leading coefficient of the Alexander polynomial of . If  , then has a unique minimal genus Seifert surface.
We present a new, more direct, proof of this result that works by counting trees in digraphs with certain properties. We also give a finiteness result for these digraphs. |
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Thu, 04/03/2010 12:00 |
Michael Groechenig (Oxford) |
Junior Geometry and Topology Seminar |
SR1 |
| Descent theory is the art of gluing local data together to global data. Beside of being an invaluable tool for the working geometer, the descent philosophy has changed our perception of space and topology. In this talk I will introduce the audience to the basic results of scheme and descent theory and explain how those can be applied to concrete examples. | |||
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Thu, 11/03/2010 12:00 |
Junior Geometry and Topology Seminar |
SR1 | |
