A solution to the Yau-Tian-Donaldson Conjecture through Special Fujita Approximations
Abstract
We show that any big line bundle on a smooth projective variety admits a special Fujita approximation: the volume and the first Riemann-Roch coefficient are both approximated by those of ample Q-line bundles on higher models. Exploiting previous works by Boucksom, Jonsson and Li, we solve the Boucksom-Jonsson Regularization Conjecture on the Non-Archimedean entropy functional. As a main consequence, we obtain a solution to the (uniform version of the) Yau-Tian-Donaldson Conjecture: a polarized smooth projective variety (X,L) admits a cscK metric if and only if it is Aut(X,L)-uniformly K-stable. This extends the known Yau-Tian-Donaldson correspondence for smooth Fano varieties.
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