Jun-Muk Hwang, Hosung Kim, Yongnam Lee, Jihun Park
Published 2010-05-24, updated 2011-03-10Version 3
Ross and Thomas introduced the concept of slope stability to study K-stability, which has conjectural relation with the existence of constant scalar curvature K\"ahler metric. This paper presents a study of slope stability of Fano manifolds of dimension $n\geq 3$ with respect to smooth curves. The question turns out to be easy for curves of genus $\geq 1$ and the interest lies in the case of smooth rational curves. Our main result classifies completely the cases when a polarized Fano manifold $(X, -K_X)$ is not slope stable with respect to a smooth curve. Our result also states that a Fano threefold $X$ with Picard number 1 is slope stable with respect to every smooth curve unless $X$ is the projective space.
Comments: 13 pages, Theorems in the original version were modified. This paper will be published in the Bulletin of the London Mathematical Society
Birational superrigidity and slope stability of Fano manifolds
Towards a criterion for slope stability of Fano manifolds along divisors
On the existence of primitive pencils for smooth curves
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