Openness of K-semistability for Fano varieties
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Publication:2081385
DOI10.1215/00127094-2022-0054zbMath1503.14040arXiv1907.02408OpenAlexW2956107307MaRDI QIDQ2081385
Yuchen Liu, Harold Blum, Chen Yang Xu
Publication date: 13 October 2022
Published in: Duke Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1907.02408
Related Items (17)
K-MODULI OF CURVES ON A QUADRIC SURFACE AND K3 SURFACES ⋮ The existence of the Kähler–Ricci soliton degeneration ⋮ Boundedness of \(n\)-complements for generalized pairs ⋮ \(K\)-stability of Fano threefolds of rank 2 and degree 14 as double covers ⋮ On wall-crossing for \(K\)-stability ⋮ ACC for local volumes and boundedness of singularities ⋮ Algebraic uniqueness of Kähler-Ricci flow limits and optimal degenerations of Fano varieties ⋮ Boundedness of complements for log Calabi-Yau threefolds ⋮ K-stability and Fujita approximation ⋮ Some observations on the dimension of Fano K-moduli ⋮ On local stability threshold of del Pezzo surfaces ⋮ Effective semi-ampleness of Hodge line bundles on curves ⋮ On K-semistable domains — more examples ⋮ A 1-dimensional component of K-moduli of del Pezzo surfaces ⋮ Openness of uniformly valuative stability on the Kähler cone of projective manifolds ⋮ K-stability and birational models of moduli of quartic \(K3\) surfaces ⋮ Optimal destabilization of K-unstable Fano varieties via stability thresholds
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