Singular Yamabe problem for scalar flat metrics on the sphere
Abstract
Let be a domain on the unit n-sphere Sn and g the standard metric of Sn, n 3. We show that there exists a conformal metric g with vanishing scalar curvature R(g)=0 such that (, g) is complete if and only if the Bessel capacity Cα, q( Sn )=0, where α=1+2n and q= n2. Our analysis utilizes some well known properties of capacity and Wolff potentials, as well as a version of the Hopf-Rinow theorem for the divergent curves.
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