Oscar Garcia-Prada, Peter B. Gothen, Ignasi Mundet i Riera
Published 2008-09-03, updated 2012-08-15Version 4
In this paper we study the moduli space of representations of a surface group (i.e., the fundamental group of a closed oriented surface) in the real symplectic group Sp(2n,R). The moduli space is partitioned by an integer invariant, called the Toledo invariant. This invariant is bounded by a Milnor-Wood type inequality. Our main result is a count of the number of connected components of the moduli space of maximal representations, i.e. representations with maximal Toledo invariant. Our approach uses the non-abelian Hodge theory correspondence proved in a companion paper arXiv:0909.4487 [math.DG] to identify the space of representations with the moduli space of polystable Sp(2n,R)-Higgs bundles. A key step is provided by the discovery of new discrete invariants of maximal representations. These new invariants arise from an identification, in the maximal case, of the moduli space of Sp(2n,R)-Higgs bundles with a moduli space of twisted Higgs bundles for the group GL(n,R).
Comments: 55 pages; v2: main results are unchanged but paper has been completely reorganized and presentation significantly improved; v3, v4: various corrections and improvements; Part 1 of v2 has been split off as the independent paper arXiv:0909.4487v1 [math.DG]
Representations of surface groups and Higgs bundles
Higgs bundles for the non-compact dual of the special orthogonal group
Surface group representations in PU(p,q) and Higgs bundles
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