On the isoperimetric quotient over scalar-flat conformal classes
Abstract
Let (M,g) be a smooth compact Riemannian manifold of dimension n with smooth boundary ∂ M. Suppose that (M,g) admits a scalar-flat conformal metric. We prove that the supremum of the isoperimetric quotient over the scalar-flat conformal class is strictly larger than the best constant of the isoperimetric inequality in the Euclidean space, and consequently is achieved, if either (i) n 12 and ∂ M has a nonumbilic point; or (ii) n 10, ∂ M is umbilic and the Weyl tensor does not vanish at some boundary point.
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