Patterns of Geodesics, Shearing, and Anosov Representations of the Modular Group
Abstract
Let X=SL3()/SO(3). Let DFR be the space of discrete faithful representations of the modular group into Isom\/(X) which map the order 2 generator to an isometry with a unique fixed point. I prove many things about the component B of DFR known as the Barbot component: It is homeomorphic to 2 × [0,∞). The boundary parametrizes the Pappus representations from [ S0\/]. The interior parametrizes the complete extension of the family of Anosov representations from [ BLV\/]. The members of B are isometry groups of embedded patterns of geodesics in X which have asymptotic properties like the edges of the Farey triangulation or shears thereof. The Anosov representations are obtained from the Pappus representations by either of two shearing operations in X. The shearing structure is encoded by two proper foliations of B into rays.
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