The stability conjecture for geodesic flows of compact manifolds without conjugate points and quasi-convex universal covering

Abstract: Let $(M,g)$ be a $C^{\infty}$ compact, boudaryless connected manifold without conjugate points with quasi-convex universal covering and divergent geodesic rays. We show that the geodesic flow of $(M,g)$ is $C^{2}$-structurally stable from Ma~{n}\'{e}'s viewpoint if and only if it is an Anosov flow, proving the so-called $C^{1}$-stability conjecture.