Weighted Bott-Chern and Dolbeault cohomology for LCK-manifolds with potential

被引：2

作者：

Ornea, Liviu ^{[1
,2
]}

Verbitsky, Misha ^{[3
,4
]}

Vuletescu, Victor ^{[1
]}

机构：

[1] Univ Bucharest, Fac Math, 14 Acad Str, Bucharest 70109, Romania

[2] Simion Stoilow Romanian Acad, Inst Math, 21 Calea Grivitei Str, Bucharest 010702, Romania

[3] Natl Res Univ HSE, Fac Math, Lab Algebra Geometry, 7 Vavilova Str, Moscow, Russia

[4] Univ Libre Bruxelles, Dept Math, Campus Plaine,CP 218-01 Blvd Triomphe, B-1050 Brussels, Belgium

来源：

JOURNAL OF THE MATHEMATICAL SOCIETY OF JAPAN | 2018年 / 70卷 / 01期

关键词：

locally conformally Kahler manifold; Vaisman manifold; potential; Dolbeault cohomology; Bott-Chern cohomology; Morse-Novikov cohomology; vanishing; CONFORMALLY KAHLER-MANIFOLDS;

D O I：

10.2969/jmsj/07017171

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

A locally conformally Kahler (LCK) manifold is a complex manifold, with a Kahler structure on its universal covering (M) over tilde, with the deck transform group acting on (M) over tilde by holomorphic homotheties. One could think of an LCK manifold as of a complex manifold with a Kahler form taking values in a local system L, called the conformal weight bundle. The L-valued cohomology of M is called Morse-Novikov cohomology; it was conjectured that (just as it happens for Kahler manifolds) the Morse-Novikov complex satisfies the de(c)-lemma, which (if true) would have far-reaching consequences for the geometry of LCK manifolds. In particular, this version of de(c)-lemma would imply existence of LCK potential on any LCK manifold with vanishing Morse-Novikov class of its L-valued Hermitian symplectic form. The de(c)-conjecture was disproved for Vaisman manifolds by Goto. We prove that the de(c)-lemma is true with coefficients in a sufficiently general power of L on any Vaisman manifold or LCK manifold with potential.

引用

页码：409 / 422

页数：14

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