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Frobenius manifolds, projective special geometry and Hitchin systems
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Claus Hertling
,
Luuk Hoevenaars
Published/Copyright:
October 19, 2010
Abstract
We consider the construction of Frobenius manifolds associated to projective special geometry and analyse the dependence on choices involved. In particular, we prove that the underlying F-manifold is canonical. We then apply this construction to integrable systems of Hitchin type.
Received: 2009-06-11
Published Online: 2010-10-19
Published in Print: 2010-December
© Walter de Gruyter Berlin · New York 2010
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Articles in the same Issue
- Surface singularities dominated by smooth varieties
- Reduction theory for mapping class groups and applications to moduli spaces
- Regularizations of residue currents
- A remark on the codimension of the Green–Griffiths locus of generic projective hypersurfaces of high degree
- Hyper-Kähler fourfolds and Grassmann geometry
- Moduli of parabolic Higgs bundles and Atiyah algebroids
- Frobenius manifolds, projective special geometry and Hitchin systems
- Covers of elliptic curves and the moduli space of stable curves
- The Toledo invariant on smooth varieties of general type
