Finsler structure of the Apollonian weak metric on the unit disc

Abstract

In this paper, we find the Finsler structure of the Apollonian weak metric on the open unit disc in R2, which turns out to be a Randers type Finsler structure and we call it as Apollonian weak-Finsler structure. In fact the Apollonian weak-Finsler structure is the deformation of the hyperbolic Poincaré metric in the unit disc by a closed 1-form. As a cosequence, the trajectories of the geodesic of this Apollonian weak-Finsler structure pointwise agrees with the geodesic of hyperbolic Poincaré metric in the open unit disc. Further, we explicitly calculate its S-curvature, Riemann curvature, Ricci curvature and flag curvature. It turns out that the S-curvature of the Apollonian weak-Finsler structure in the unit disc is bounded below by 32, while its flag curvature K satisfies -∞< K<-1, in particular, it becomes a Hadamard manifold.