K-polystability of two smooth Fano threefolds

Abstract

We give new proofs of the K-polystability of two smooth Fano threefolds. One of them is a~smooth divisor in P1×P1×P2 of degree (1,1,1), which is unique up to isomorphism. Another one is the~blow up of the complete intersection \x0x3+x1x4+x2x5=x02+ω x12+ω2x22+(x32+ω x42+ω2x52)+(x0x3+ω x1x4+ω2x2x5)\⊂P5 in the conic cut out by x0=x1=x2=0, where ω is a~primitive cube root of unity.