On Finsler surfaces with certain flag curvatures

Abstract

In the present paper, we find out necessary and sufficient conditions for a Finsler surface (M,F) to be Landsbregian in terms of the Berwald curvature 2-forms. We study Finsler surfaces which satisfy some flag curvature K conditions, viz., V(K)=0,\,\,V(K)= -I/F2 and V(K)=-I\,K, where I is the Cartan scalar. In order to do so, we investigate some geometric objects associated with the global Berwald distribution D:= span\S, H, V:=JH\ of a 2-dimensional Finsler metrizable nonflat spray S. We obtain some classifications of such surfaces and show that under what hypothesis these surfaces turn to be Riemannian. The existence of a first integral for the geodesic flow in each case has some remarkable consequences concerning rigidity results. We prove that a Finsler surface with V(K)= -I/F2 and either S(K)=0 or S(J)=0 is Riemannian. Further, a Finsler surface with V(K)=-I\,K and S(K)=0 is Riemannian.