Iteration of closed geodesics in stationary Lorentzian manifolds

Abstract

Following the lines of a celebrated result by R. Bott (Comm. Pure Appl. Math. 9, 1956) we study the Morse index of the iterated of a closed geodesic in stationary Lorentzian manifolds, or, more generally, of a closed Lorentzian geodesic that admits a timelike periodic Jacobi field. Given one such closed geodesic γ, we prove the existence of a locally constant integer valued map γ on the unit circle with the property that the Morse index of the iterated γN is equal, up to a correction term εγ∈\0,1\, to the sum of the values of γ at the N-th roots of unity. The discontinuities of γ occur at a finite number of points of the unit circle, that are special eigenvalues of the linearized Poincar\'e map of γ. We discuss some applications of the theory.