L2-extension indices, sharper estimates and curvature positivity

Abstract

In this paper, we introduce a new concept of L2-extension indices. This index is a function that gives the minimum constant with respect to the L2-estimate of an Ohsawa--Takegoshi-type extension at each point. By using this notion, we propose a new way to study the positivity of curvature. We prove that there is an equivalence between how sharp the L2-extension is and how positive the curvature is. New examples of sharper L2-extensions are also systematically given. As applications, we use the L2-extension index to study Pr\'ekopa-type theorems and to study the positivity of a certain direct image sheaf. We also provide new characterizations of pluriharmonicity and curvature flatness.