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García Prada, O. and Gothen, P.B. and Muñoz, Vicente (2007) Betti numbers of the moduli space of rank 3 parabolic Higgs bundles. Memoirs of the American Mathematical Society , 187 (879). viii80. ISSN 19476221

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Official URL: http://www.ams.org/bookstoregetitem/item=MEMO187879
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http://arxiv.org/pdf/math/0411242v3.pdf  Organisation 
http://www.ams.org  Organisation 
Abstract
Parabolic Higgs bundles on a Riemann surface are of interest for many reasons, one of them being their importance in the study of representations of the
fundamental group of the punctured surface in the complex general linear group. In this paper we calculate the Betti numbers of the moduli space of rank 3 parabolic
Higgs bundles with fixed and nonfixed determinant, using Morse theory. A key point is that certain critical submanifolds of the Morse function can be identified with moduli spaces of parabolic triples. These moduli spaces come in families depending on a real parameter and we carry out a careful analysis of them by studying their variation with this parameter. Thus we obtain in particular information about the topology of the moduli spaces of parabolic triples for the value of the parameter relevant to the study of parabolic Higgs bundles. The remaining critical submanifolds are also described: one of them is the moduli space of parabolic bundles, while the remaining ones have a description in terms of symmetric products of the Riemann surface. As another consequence of our Morse theoretic analysis, we obtain a proof of the parabolic version of a theorem of Laumon, which states that the nilpotent cone (the preimage of zero under the Hitchin map) is a Lagrangian subvariety of the moduli space of parabolic
Higgs bundles.
Item Type:  Article 

Uncontrolled Keywords:  Parabolic bundles; Higgs bundles; Moduli spaces. 
Subjects:  Sciences > Mathematics > Algebraic geometry 
ID Code:  21088 
Deposited On:  29 Apr 2013 15:29 
Last Modified:  12 Dec 2018 15:13 
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