Kähler–Einstein metrics along the smooth continuity method

Abstract: Abstract. We show that if a Fano manifold M is K-stable with respect to special degenerations equivariant under a compact group of automorphisms, then M admits a Kähler-Einstein metric. This is a strengthening of the solution of the Yau-Tian-Donaldson conjecture for Fano manifolds by Chen-DonaldsonSun [17], and can be used to obtain new examples of Kähler-Einstein manifolds. We also give analogous results for twisted Kähler-Einstein metrics and Kahler-Ricci solitons.

“…The equivariant version of Theorem 2.12 also follows from the work of Datar-Székelyhidi [11], while the non-equivariant version is also a consequence of the proof of the Yau-Tian-Donaldson conjecture [8,36].…”

“…The first, due to DatarSzékelyhidi [11], states that it is enough to consider equivariant test configurations.…”

“…We will need some simplifications of the K-stability condition. The first, due to Datar-Székelyhidi [11], states that it is enough to consider equivariant test configurations. Definition 2.8.…”

On K-stability of finite covers

“…The equivariant version of Theorem 2.12 also follows from the work of Datar-Székelyhidi [11], while the non-equivariant version is also a consequence of the proof of the Yau-Tian-Donaldson conjecture [8,36].…”

“…The first, due to DatarSzékelyhidi [11], states that it is enough to consider equivariant test configurations.…”

“…We will need some simplifications of the K-stability condition. The first, due to Datar-Székelyhidi [11], states that it is enough to consider equivariant test configurations. Definition 2.8.…”

On K-stability of finite covers

“…In [7] Li determined a simple formula for R(X Δ ), where X Δ is the polarized toric Fano manifold determined by a reflexive lattice polytope Δ. This result was later recovered in [4], by Datar and Székelyhidi, using notions of G-equivariant K-stability. Using this same method we obtain an effective formula for manifolds with a torus action of complexity one, in terms of the combinatorial data of its divisorial polytope.…”

Greatest lower bounds on Ricci curvature for Fano T-manifolds of complexity one

“…The analogue of the Yau–Tian–Donaldson conjecture described in predicts that the existence of a twisted Kähler–Einstein metric (hence twisted cscK) on is equivalent to the map being equivariantly K‐stable. There are now several ways of producing explicit examples of (equivariantly) K‐stable Fano varieties , for example, the threefolds with a two‐dimensional torus action of Ilten–Süss , which admit Kähler–Einstein metrics by the work of Chen–Donaldson–Sun and Datar–Székelyhidi . Thus by analogy, assuming an analogue of the Yau–Tian–Donaldson conjecture for Fano maps can be proved, we hope to produce cscK metrics on fibrations, where the base is a Fano map.…”

Extremal metrics on fibrations