Dual Thurston norm of Euler classes of foliations on negative curvature 3-Manifolds
Abstract
In this paper we give an upper bound estimate on the dual Thurston norm of the Euler class of an arbitrary smooth foliation F of dimension one defined on a closed three-dimensional orientable manifold M3 of negative curvature, which depends on the constants bounded the injectivity radius inj(M3), the volume Vol(M3), sectional curvature of the manifold M3 and the mean curvature modulus of the leaves of the foliation F.
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