On the rigidity of the stable norm and Mather's β-function for geodesic flows
Abstract
We investigate rigidity phenomena associated to the stable norm and Mather's β-function for Riemannian geodesic flows on closed manifolds. Given two metrics g1 and g2, we compare these objects pointwise at individual homology classes. Our main result establishes that if Mather's β-function (or the stable norm) of g2 at a non-zero homology class h equals that of g1 at h multiplied by a suitable factor determined by the metrics, then the two metrics are homothetic on the Mather set of homology h associated to g1. In the case of conformally equivalent metrics, this yields a pointwise criterion for homothety on the projected Mather set. Some consequences are discussed, including a pointwise rigidity result on the 2-torus implying that if a metric has the same Mather's β-function at some non-zero homology class as a normalized flat metric in the same conformal class, then the metric must be flat. This result can be considered a pointwise version of a similar global result by Bangert. Finally, an extension of these results to Ma\~n\'e's perturbations of general Tonelli Lagrangians is discussed.
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