• Corpus ID: 235376777

Extremal potentials and equilibrium measures associated to collections of K\"ahler classes

@inproceedings{Hultgren2021ExtremalPA,
  title={Extremal potentials and equilibrium measures associated to collections of K\"ahler classes},
  author={Jakob Hultgren},
  year={2021}
}
Given a collection of Kähler forms and a continuous weight on a compact complex manifold we show that it is possible to define natural new notions of extremal potentials and equilibrium measures which coincide with classical notions when the collection is a singleton. We prove two regularity results and set up a variational framework. Applications to Fekete points are treated elsewhere. 
1 Citations
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A sequence of point configurations on a compact complex manifold is asymptotically Fekete if it is close to maximizing a sequence of Vandermonde determinants. These Vandermonde determinants are

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