Stability and canonical metrics on projective spaces blown up along a line
Abstract
Let BlP1 Pn be a K\"ahler manifold obtained by blowing up a complex projective space Pn along a line P1. We prove that BlP1 Pn does not admit constant scalar curvature K\"ahler metrics in any rational K\"ahler class, but admits extremal metrics, with an explicit formula in action-angle coordinates, in K\"ahler classes that are close to the pullback of the Fubini--Study class.
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