The canonical lamination calibrated by a cohomology class

Abstract

Let M be a closed oriented Riemannian manifold of dimension 2 ≤ d ≤ 7, and let ∈ Hd - 1(M, R) have unit norm. We construct a lamination λ whose leaves are exactly the minimal hypersurfaces which are calibrated by every calibration in . The geometry of λ is closely related to the the geometry of the unit ball of the stable norm on Hd - 1(M, R), and so we deduce several results constraining the geometry of the stable norm ball in terms of the topology of M. These results establish a close analogy between the stable norm on Hd - 1(M, R) and the earthquake norm on the tangent space to Teichm\"uller space.

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