Delta-invariants for Fano varieties with large automorphism groups
Abstract
For a variety X, a big Q-divisor L and a closed connected subgroup G ⊂ Aut(X, L) we define a G-invariant version of the δ-threshold. We prove that for a Fano variety (X, -KX) and a connected subgroup G ⊂ Aut(X) this invariant characterizes G-equivariant uniform K-stability. We also use this invariant to investigate G-equivariant K-stability of some Fano varieties with large groups of symmetries, including spherical Fano varieties. We also consider the case of G being a finite group.
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