Pappus Theorem, Schwartz Representations and Anosov Representations

Abstract

In the paper "Pappus's theorem and the modular group", R. Schwartz constructed a 2-dimensional family of faithful representations of the modular group PSL(2,Z) into the group G of projective symmetries of the projective plane via Pappus Theorem. The image of the unique index 2 subgroup PSL(2,Z)o of PSL(2,Z) under each representation is in the subgroup PGL(3,R) of G and preserves a topological circle in the flag variety, but is not Anosov. In her PhD Thesis, V. P. Val\'erio elucidated the Anosov-like feature of Schwartz representations: For every , there exists a 1-dimensional family of Anosov representations of PSL(2,Z)o into PGL(3,R) whose limit is the restriction of to PSL(2,Z)o. In this paper, we improve her work: For each , we build a 2-dimensional family of Anosov representations of PSL(2,Z)o into PGL(3,R) containing and a 1-dimensional subfamily of which can extend to representations of PSL(2,Z) into G. Schwartz representations are therefore, in a sense, the limits of Anosov representations of PSL(2,Z) into G.