Convexity of asymptotic geodesics in Hilbert Geometry

Abstract

If is the interior of a convex polygon in R2 and f,g two asymptotic geodesics, we show that the distance function d(f(t),g(t)) is convex for t sufficiently large. The same result is obtained in the case ∂ is of class C2 and the curvature of ∂ at the point f(∞)=g(∞) does not vanish. An example is provided for the necessity of the curvature assumption.