Boundary points, Minimal L2 integrals and Concavity property

Abstract

For the purpose of proving the strong openness conjecture of multiplier ideal sheaves, Jonsson-Mustata posed an enhanced conjecture and proved the two-dimensional case, which says that: the Lebesgue measure of the set \coF()-|F|< r\ divided by r2 has a uniform positive lower bound independent of r, for a plurisubharmonic function and a holomorphic function F near the origin o. Jonsson-Mustata's conjecture was proved by Guan-Zhou depending on the truth of the strong openness conjecture. However, it is still a question whether one can prove Jonsson-Mustata's conjecture without using the strong openness property, and obtain a sharp effectiveness result for this conjecture. In this article, we use an L2 method with the weight functions -|F| and firstly consider a module at at a boundary point of the sublevel sets of a plurisubharmonic function. By studying the minimal L2 integrals on the sublevel sets of a plurisubharmonic function with respect to the module at the boundary point, we establish a concavity property of the minimal L2 integrals. As applications, we obtain a sharp effectiveness result related to Jonsson-Mustata's conjecture, which completes the approach from the conjecture to the strong openness property. We also obtain a strong openness property of the module and a lower semi-continuity property with respect to the module.