By Megan Roda
Let $\mathrm{X}$ be a K3 surface with a large automorphism group $\mathrm{Aut}(\mathrm{X})$ (we do not assume that it contains any parabolic elements). Consider a probability measure $\mu$ on $\mathrm{Aut}(\mathrm{X})$ using the work of Cantat and DuJardin (2020) we study hyperbolic, ergodic -stationary probability measures, and the supports of their conditional measures on the stable and unstable manifolds (which are a.e. biholomorphic to ) using the techniques of Benoist and Quint (2011), and Eskin and Mirzakhani (2018).
By Bruno Santiago
By Roland Roeder
By Florent Ygouf
By Omri Solan
By Megan Roda
By Rafael Potrie
By David Fisher
By Federico Rodriguez Hertz
By Mason Hart
By Leon Carvajales
By Sara Maloni
By Sara Maloni
By Sara Maloni
