Small cocycles, fine torus fibrations, and a {mathbb Z}² subshift with neither

Following an earlier similar conjecture of Kellendonk and Putnam, Giordano, Putnam and Skau conjectured that all minimal, free ${\mathbb Z}^d$ actions on Cantor sets admit "small cocycles." These represent classes in $H^1$ that are mapped to small vectors in ${\mathbb R}^d$ by the Ruelle-Sullivan (RS) map. We show that there exist ${\mathbb Z}^d$ actions where no such small cocycles exist, and where the image of $H^1$ under RS is ${\mathbb Z}^d$. Our methods involve tiling spaces and shape deformations, and along the way we prove a relation between the image of RS and the set of "virtual eigenvalues," i.e. elements of ${\mathbb R}^d$ that become topological eigenvalues of the tiling flow after an arbitrarily small change in the shapes and sizes of the tiles.