A Non-Integrable Ohsawa-Takegoshi-Type L2 Extension Theorem

Abstract

Given a complete K\"ahler manifold (X,\,ω) with finite second Betti number, a smooth complex hypersurface Y⊂ X and a smooth real d-closed (1,\,1)-form α on X with arbitrary, possibly non-rational, De Rham cohomology class \α\ satisfying a certain assumption, we obtain extensions to X, with control of their L2-norms, of smooth sections of the canonical bundle of Y twisted by the restriction to Y of any C∞ complex line bundle Lk in a sequence of asymptotically holomorphic line bundles whose first Chern classes approximate the positive integer multiples k\α\ of the original class. Besides a known non-integrable (0,\,1)-connection ∂k on Lk, the proof uses two twisted Laplace-type elliptic differential operators that are introduced and investigated, leading to Bochner-Kodaira-Nakano-type (in-)equalities, a spectral gap result and an a priori L2-estimate. The main difference from the classical Ohsawa-Takegoshi extension theorem is that the objects need not be holomorphic, but only asymptotically holomorphic as k∞. The possibility that ∂k does not square to 0 accounts for its lack of commutation with the Laplacian ''k it induces. We hope this study is a possible first step in a future attack on Siu's conjecture predicting the invariance of the plurigenera in K\"ahler families of compact complex manifolds.