Length spectrum rigidity and flexibility of spheres of revolution with one equator

Abstract

We define a notion of marked length spectrum for S1-symmetric Riemannian metrics on the two-sphere having only one equator. We prove that isospectral metrics in this class have conjugate geodesic flows. Under a further Z2-symmetry assumption, we show that the marked length spectrum determines the metric. Finally, we show that every isospectral class of metrics contains a unique Z2-symmetric metric and give an explicit description of this isospectral class as an infinite dimensional convex set, generalizing the known description of S1-symmetric Zoll metrics. This paper contains also two appendices, in which we provide an elementary proof of the fact that a C2 real valued function on an interval is determined by the set of tangent lines to its graph, and we classify a class of S1-invariant contact forms on three-manifolds.