Real Bialynicki-Birula flows in moduli spaces of Higgs bundles
Abstract
Let X be a compact Riemann surface X of genus ≥slant 2 and let σ:X X be an anti-holomorphic involution. Using real and quaternionic systems of Hodge bundles, we study the topology of the real locus R MDol(r,d) of the moduli space of semistable Higgs bundles of rank r and degree d on X, for the induced real structure (E,φ) (σ*(E),σ*(φ)). We show in particular that, when gcd(r,d)=1, the number of connected components of R MDol(r,d) coincides with that of R Picd(X), which is well-known.
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