On the Curvature of Conic Kähler–Einstein Metrics
2018
We prove a regularity result for Monge–Ampere equations degenerate along smooth divisor on Kahler manifolds in Donaldson’s spaces of \(\beta \)-weighted functions. We apply this result to study the curvature of Kahler metrics with conical singularities and give a geometric sufficient condition on the divisor for its boundedness.
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