Note on the conjecture of D.Blair in contact Riemannian geometry
Abstract
The conjecture of D.Blair says that there are no nonflat Riemannian metrics of nonpositive curvature compatible with a contact structure. We prove this conjecture for a certain class of contact structures on closed 3-dimensional manifolds and construct a local counterexample. We also prove that a hyperbolic metric on R3 cannot be compatible with any contact structure.
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