On the domination of surface-group representations in PU(2,1)
Abstract
This article explores surface-group representations into the complex hyperbolic group PU(2,1) and presents domination results for a special class of representations called T-bent representations. Let Sg,k be a punctured surface of negative Euler characteristic. We prove that for a T-bent representation : π1(Sg,k) → PU(2,1), there exists a discrete and faithful representation 0: π1(Sg,k) → PO(2,1) that dominates in the Bergman translation length spectrum, while preserving the lengths of the peripheral loops.
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