Translation surfaces and the curve graph in genus two

Abstract

Let S be a (topological) compact closed surface of genus two. We associate to each translation surface (X,ω) ∈ H(2)(1,1) a subgraph C cyl of the curve graph of S. The vertices of this subgraph are free homotopy classes of curves which can be represented either by a simple closed geodesic, or by a concatenation of two parallel saddle connections (satisfying some additional properties) on X. The subgraph C cyl is by definition GL+(2,R)-invariant. Hence, it may be seen as the image of the corresponding Teichm\"uller disk in the curve graph. We will show that C cyl is always connected and has infinite diameter. The group Aff+(X,ω) of affine automorphisms of (X,ω) preserves naturally C cyl, we show that Aff+(X,ω) is precisely the stabilizer of C cyl in Mod(S). We also prove that C cyl is Gromov-hyperbolic if (X,ω) is completely periodic in the sense of Calta. It turns out that the quotient of C cyl by Aff+(X,ω) is closely related to McMullen's prototypes in the case (X,ω) is a Veech surface in H(2). We finally show that this quotient graph has finitely many vertices if and only if (X,ω) is a Veech surface for (X,ω) in both strata H(2) and H(1,1).