$ l^2 $扩展$ \ bar \ bar \ partial $ clucted表格在弱pseudoconvexKähler歧管上

论文标题

$ l^2 $扩展$ \ bar \ bar \ partial $ clucted表格在弱pseudoconvexKähler歧管上

$L^2$ extension of $\bar\partial$-closed forms on weakly pseudoconvex Kähler manifolds

论文作者

Chen, Jian, Rao, Sheng

论文摘要

V. Koziarz对与J. McNeal-D的初始扩展有关的一些修改部分的规律性的观察结合了。 Varolin的规律性论点是，我们概括了McNeal的两个定理 - varolin的$ l^2 $扩展，$ \ bar \ partial $ clos \ partial $ cluct的高度表格在Stein歧管上，属于弱假性的kähller案件在混合效率条件下。

Combining V. Koziarz's observation about the regularity of some modified section related to the initial extension with J. McNeal--D. Varolin's regularity argument, we generalize two theorems of McNeal--Varolin for the $L^2$ extension of $\bar\partial$-closed high-degree forms on a Stein manifold to the weakly pseudoconvex Kähler case under mixed positivity conditions.

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