On Character Variety of Anosov Representations
Abstract
Let be the fundamental group of a k-punctured, k ≥ 0, closed connected orientable surface of genus g ≥ 2. We show that the character variety of the (Q+, Q-)-Anosov irreducible representations, resp. the character variety of the (P+, P-)-Anosov Zariski dense representations of into (n , ), n ≥ 2, is a complex manifold of complex dimension (2g+k-2)(n2-1). For =π1(g), we also show that these character varieties are holomorphic symplectic manifolds.
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