Dominating surface-group representations via Fock-Goncharov coordinates

Abstract

Let S be a punctured surface of negative Euler characteristic. We show that given a generic representation :π1(S) → PSLn(C), there exists a positive representation 0:π1(S) → PSLn(R) that dominates in the Hilbert length spectrum as well as in the translation length spectrum, for the translation length in the symmetric space Xn= PSLn(C)/PSU(n). Moreover, the 0-lengths of peripheral curves remain unchanged. The dominating representation 0 is explicitly described via Fock-Goncharov coordinates. Our methods are linear-algebraic, and involve weight matrices of weighted planar networks.

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