Conformal metric sequences with integral-bounded scalar curvature
Abstract
Let (M; g) be a smooth compact Riemiannian manifold without boundary and gk be a metric conformal to g. Suppose vol(M; gk)+||Rk||Lp(M;gk) < C, where Rk is the scalar curvature and p > n2. We will use the 3-circle theorem and the John-Nirenberg inequality to study the bubble tree convergence of gk.
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