On the existence of critical compatible metrics on contact 3-manifolds

Abstract

We disprove the generalized Chern-Hamilton conjecture on the existence of critical compatible metrics on contact 3-manifolds. More precisely, we show that a contact 3-manifold (M,α) admits a critical compatible metric for the Chern-Hamilton energy functional if and only if it is Sasakian or its associated Reeb flow is C∞-conjugate to an algebraic Anosov flow modeled on SL(2, R). In particular, this yields a complete topological classification of compact 3-manifolds that admit critical compatible metrics. As a corollary we prove that no contact structure on T3 admits a critical compatible metric and that critical compatible metrics can only occur when the contact structure is tight.

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