Blow-up phenomena for the σ2-Yamabe equation

Abstract

For every integer n27, we construct a smooth metric on Sn that is invariant under the antipodal map and is not locally conformally flat. For this fixed background metric, the normalized σ2-Yamabe equation admits a noncompact family of positive Γ2+-admissible solutions. The main difficulty is the possible loss of ellipticity of the linearized operator. This difficulty does not occur for the scalar Yamabe equation, whose linearization has a fixed Laplace-type principal part. In the σ2 problem, the positive Newton tensor of a standard bubble decays in the far field, while the terms produced by the background metric need not decay at the same rate. Our construction provides the relative decay needed to keep the conformal metrics inside the ellipticity cone. A quartic profile in the finite-dimensional reduction yields the endpoint dimension n=27.

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