On the K-stability of blow-ups of projective bundles
Abstract
We investigate the K-stability of certain blow-ups of P1-bundles over a Fano variety V, where the P1-bundle is the projective compactification of a line bundle L proportional to -KV and the center of the blow-up is the image along a positive section of a divisor B also proportional to L. When V and B are smooth, we show that, for B Q 2L, the K-semistability and K-polystability of the blow-up is equivalent to the K-semistability and K-polystability of the log Fano pair (V,aB) for some coefficient a explicitly computed. We also show that, for B Q l L, l ≠ 2, the blow-up is K-unstable.
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