The sharp σ2-curvature inequality on the sphere in quantitative form
Abstract
Among all metrics on Sd with d>4 that are conformal to the standard metric and have positive scalar curvature, the total σ2-curvature, normalized by the volume, is uniquely (up to M\"obius transformations) minimized by the standard metric. We show that if a metric almost minimizes, then it is almost the standard metric (up to M\"obius transformations). This closeness is measured in terms of Sobolev norms of the conformal factor, and we obtain the optimal stability exponents for two different notions of closeness. This is a stability result for an optimization problem whose Euler-Lagrange equation is fully nonlinear.
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