Optimal Degenerations of K-unstable Fano threefolds

Abstract

We explicitly determine the optimal degenerations of Fano threefolds X in family No 2.23 of Mori-Mukai's list as predicted by the Hamilton-Tian conjecture. More precisely, we find a special degeneration (X, 0) of X such that (X0, 0) is weighted K-polystable, which is equivalent to (X0, 0) admitting a K\"ahler-Ricci soliton (KRS) by HL23 and BLXZ23. Furthermore, we study the moduli spaces of (X0, 0). The H-invariant of X divides the natural parameter space into two strata, which leads to different moduli spaces of KRS Fano varieties. We show that one of them is isomorphic to the GIT-moduli space of biconic curves C⊂eq P1× P1, and the other one is a single point.