Vertices of the Harder and Narasimhan polygons and the laws of large numbers

Abstract: We build on the recent techniques of Codogni and Patakfalvi (2021, Inventiones Mathematicae 223, 811–894), which were used to establish theorems about semi-positivity of the Chow Mumford line bundles for families of $\mathrm {K}$ -semistable Fano varieties. Here, we apply the Central Limit Theorem to ascertain the asymptotic probabilistic nature of the vertices of the Harder and Narasimhan polygons. As an application of our main result, we use it to establish a filtered vector spac… Show more

“…Related ideas have been used in diophantine approximations, see Faltings-Wüstholz [15], cf. Grieve [22]. Sektnan-Tipler [42] have studied a related question of semistability of pullbacks along submersions.…”

On Monge–Ampère Volumes of Direct Images

“…Related ideas have been used in diophantine approximations, see Faltings-Wüstholz [15], cf. Grieve [22]. Sektnan-Tipler [42] have studied a related question of semistability of pullbacks along submersions.…”

On Monge–Ampère Volumes of Direct Images

Categorification of Harder–Narasimhan theory via slope functions valued in totally ordered sets