On an L2 extension theorem from log-canonical centres with log-canonical measures

Abstract

With a view to prove an Ohsawa-Takegoshi type L2 extension theorem with L2 estimates given with respect to the log-canonical (lc) measures, a sequence of measures each supported on lc centres of specific codimension defined via multiplier ideal sheaves, this article is aiming at providing evidence and possible means to prove the L2 estimates on compact K\"ahler manifolds X. A holomorphic family of L2 norms on the ambient space X is introduced which is shown to "deform holomorphically" to an L2 norm with respect to an lc-measure. Moreover, the latter norm is shown to be invariant under a certain normalisation which leads to a "non-universal" L2 estimate on compact X. Explicit examples on P3 with detailed computation are presented to verify the expected L2 estimates for extensions from lc centres of various codimensions and to provide hint for the proof of the estimates in general.