Dynamic alpha-invariants of del Pezzo surfaces
Abstract
For every smooth del Pezzo surface S, smooth curve C∈|-KS| and β∈(0,1], we compute the α-invariant of Tian α(S,(1-β)C) and prove the existence of K\"ahler--Einstein metrics on S with edge singularities along C of angle 2πβ for β in certain interval. In particular we give lower bounds for the invariant R(S,C), introduced by Donaldson as the supremum of all β∈(0,1] for which such a metric exists.
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