Overtwisted energy-minimizing curl eigenfields

Abstract

We consider energy-minimizing divergence-free eigenfields of the curl operator in dimension three from the perspective of contact topology. We give a negative answer to a question of Etnyre and the first author by constructing curl eigenfields which minimize L2 energy on their co-adjoint orbit, yet are orthogonal to an overtwisted contact structure. We conjecture that K-contact structures on S1-bundles always define tight minimizers, and prove a partial result in this direction.

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