Finite Energy Geodesic Rays in Big Cohomology Classes

Abstract

For a big class represented by θ, we show that the metric space (Ep(X,θ),dp) for p ≥ 1 is Buseman convex. This allows us to construct a chordal metric dpc on the space of geodesic rays in Ep(X,θ). We also prove that the space of finite p-energy geodesic rays with the chordal metric dpc is a complete geodesic metric space. With the help of the metric dp, we find a characterization of geodesic rays lying in Ep(X,θ) in terms of the corresponding test curves via the Ross-Witt Nystr\"om correspondence. This result is new even in the K\"ahler setting.