On Berman-Gibbs stability and K-stability of \(\mathbb{Q}\)-Fano varieties (Q2797472)

Let \(X\) be a \(\mathbb Q\)-Fano variety, that is a complex projective variety with at most klt singularities such that the anticanonical divisor \(-K_X\) is \(\mathbb Q\)-Cartier and ample. The question under which conditions the pair \((X, -K_X)\) is \(K\)-stable has been intensively studied over the last years. \textit{R. J. Berman} introduced in [Invent. Math. 203, No. 3, 973--1025 (2016, Zbl. 1353.14051)] the notion of Gibbs stability which is defined in terms of certain log-canonical thresholds obtained by considering the pluri-anticanonical linear systems \(|-k K_X|\). In this paper the author proves that if a \(\mathbb Q\)-Fano variety is (semi-)stable in the Berman-Gibbs sense, then the pair \((X, -K_X)\) is \(K\)-(semi-)stable.