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Main Authors: Gentili, Giovanni, Tardini, Nicoletta
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2207.09168
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_version_ 1866911951412527104
author Gentili, Giovanni
Tardini, Nicoletta
author_facet Gentili, Giovanni
Tardini, Nicoletta
contents Let $(M,I,J,K,Ω)$ be a compact HKT manifold and denote with $\partial$ the conjugate Dolbeault operator with respect to $I$, $\partial_J:=J^{-1}\overline\partial J$, $\partial^Λ:=[\partial,Λ]$ where $Λ$ is the adjoint of $L:=Ω\wedge-$. Under suitable assumptions, we study Hodge theory for the complexes $(A^{\bullet,0},\partial,\partial_J)$ and $(A^{\bullet,0},\partial,\partial^Λ)$ showing a similar behavior to Kähler manifolds. In particular, several relations among the Laplacians, the spaces of harmonic forms and the associated cohomology groups, together with Hard Lefschetz properties, are proved. Moreover, we show that for a compact HKT $\mathrm{SL}(n,\mathbb{H})$-manifold the differential graded algebra $(A^{\bullet,0},\partial)$ is formal and this will lead to an obstruction for the existence of an HKT $\mathrm{SL}(n,\mathbb{H})$-structure $(I,J,K,Ω)$ on a compact complex manifold $(M,I)$. Finally, balanced HKT structures on solvmanifolds are studied.
format Preprint
id arxiv_https___arxiv_org_abs_2207_09168
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle HKT manifolds: Hodge theory, formality and balanced metrics
Gentili, Giovanni
Tardini, Nicoletta
Differential Geometry
53C26, 58A14, 22E25
Let $(M,I,J,K,Ω)$ be a compact HKT manifold and denote with $\partial$ the conjugate Dolbeault operator with respect to $I$, $\partial_J:=J^{-1}\overline\partial J$, $\partial^Λ:=[\partial,Λ]$ where $Λ$ is the adjoint of $L:=Ω\wedge-$. Under suitable assumptions, we study Hodge theory for the complexes $(A^{\bullet,0},\partial,\partial_J)$ and $(A^{\bullet,0},\partial,\partial^Λ)$ showing a similar behavior to Kähler manifolds. In particular, several relations among the Laplacians, the spaces of harmonic forms and the associated cohomology groups, together with Hard Lefschetz properties, are proved. Moreover, we show that for a compact HKT $\mathrm{SL}(n,\mathbb{H})$-manifold the differential graded algebra $(A^{\bullet,0},\partial)$ is formal and this will lead to an obstruction for the existence of an HKT $\mathrm{SL}(n,\mathbb{H})$-structure $(I,J,K,Ω)$ on a compact complex manifold $(M,I)$. Finally, balanced HKT structures on solvmanifolds are studied.
title HKT manifolds: Hodge theory, formality and balanced metrics
topic Differential Geometry
53C26, 58A14, 22E25
url https://arxiv.org/abs/2207.09168