Semiclassical analysis of L-parabolic flat connections with rank-at-most-1 curvature directly encodes higher complex structures and cotangent variations.
Cross Ratios, Anosov Representations and the Energy Functional on Teichmuller Space
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abstract
We study Hitchin representations and maximal symplectic representations of surface groups, which can be both thought of as generalisations of Fuchsian representations. We show that the corresponding energy functionals are proper on Teichmuller space. We also prove that the mapping class group acts properly on the corresponding moduli spaces. These two results follows from the fact these representations are well displacing which is a consequence they are associated to cross ratios. We state some applications.
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math.DG 1years
2020 1verdicts
UNVERDICTED 1representative citing papers
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Higher Complex Structures and Flat Connections
Semiclassical analysis of L-parabolic flat connections with rank-at-most-1 curvature directly encodes higher complex structures and cotangent variations.