Magnetic curvature and existence of a closed magnetic geodesic on low energy levels

Abstract

To a Riemannian manifold (M, g) endowed with a magnetic form σ and its Lorentz operator we associate an operator M, called the magnetic curvature operator. Such an operator encloses the classical Riemannian curvature of the metric g together with terms of perturbation due to the magnetic interaction of σ. From M we derive the magnetic sectional curvature Sec and the magnetic Ricci curvature Ric which generalize in arbitrary dimension the already known notion of magnetic curvature previously considered by several authors on surfaces. On closed manifolds, under the assumption of Ric being positive on an energy level below the Ma\~n\'e critical value, with a Bonnet-Myers argument, we establish the existence of a contractible periodic orbit. In particular, when σ is nowhere vanishing, this implies the existence of a contractible periodic orbit on every energy level close to zero. Finally, on closed oriented even dimensional manifolds, we discuss about the topological restrictions which appear when one requires Sec to be positive.