English

Optimal $L^2$ Extensions of Openness Type

Complex Variables 2024-05-22 v3

Abstract

We study the following optimal L2L^2 extension problem of openness type: given a complex manifold MM, a closed subvariety SMS\subset M and a holomorphic vector bundle EME\rightarrow M, for any L2L^2 holomorphic section ff defined on some open neighborhood UU of SS, find an L2L^2 holomorphic section FF on MM such that FS=fSF|_S = f|_S, and the L2L^2 norm of FF on MM is optimally controlled by the L2L^2 norm of ff on UU. Answering the above problem, we prove an optimal L2L^2 extension theorem of openness type on weakly pseudoconvex K\"ahler manifolds, which generalizes a couple of known results on such a problem. Moreover, we prove a product property for certain minimal L2L^2 extensions and give an alternative proof to a version of the above L2L^2 extension theorem. We also present some applications to the usual optimal L2L^2 extension problem and the equality part of Suita's conjecture.

Keywords

Cite

@article{arxiv.2202.04791,
  title  = {Optimal $L^2$ Extensions of Openness Type},
  author = {Wang Xu and Xiangyu Zhou},
  journal= {arXiv preprint arXiv:2202.04791},
  year   = {2024}
}

Comments

72 pages. Improved version of the first author's PhD thesis at AMSS, CAS. In this final version, Sections 7.5 and 7.7 are new. Due to length considerations, this article was divided into two parts during the submission. The first part (Sect. 1-6) was published online by Math. Ann., and the second part (Sect. 7) was accepted by Ann. Inst. Fourier

R2 v1 2026-06-24T09:29:19.878Z