Generalized killing spinors with imaginary killing function and conformal killing fields

Global Differential Geometry and Global Analysis - Lecture Notes in Mathematics ◽

10.1007/bfb0083642 ◽

1991 ◽

pp. 192-198 ◽

Cited By ~ 8

Author(s):

Hans-Bert Rademacher

Keyword(s):

Conformal Killing ◽

Killing Spinors ◽

Killing Fields ◽

Killing Function ◽

Generalized Killing Spinors

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Generalizations of 3-Sasakian manifolds and skew torsion

Advances in Geometry ◽

10.1515/advgeom-2018-0036 ◽

2020 ◽

Vol 20 (3) ◽

pp. 331-374 ◽

Cited By ~ 2

Author(s):

Ilka Agricola ◽

Giulia Dileo

Keyword(s):

Ricci Curvature ◽

General Notion ◽

Heisenberg Groups ◽

Canonical Connection ◽

Contact Metric Manifolds ◽

Special Cases ◽

Commutator Function ◽

Killing Function ◽

Generalized Killing Spinors ◽

Sasaki Manifolds

AbstractIn the first part, we define and investigate new classes of almost 3-contact metric manifolds, with two guiding ideas in mind: first, what geometric objects are best suited for capturing the key properties of almost 3-contact metric manifolds, and second, the new classes should admit ‘good’ metric connections with skew torsion. In particular, we introduce the Reeb commutator function and the Reeb Killing function, we define the new classes of canonical almost 3-contact metric manifolds and of 3-(α, δ)-Sasaki manifolds (including as special cases 3-Sasaki manifolds, quaternionic Heisenberg groups, and many others) and prove that the latter are hypernormal, thus generalizing a seminal result of Kashiwada. We study their behaviour under a new class of deformations, called 𝓗-homothetic deformations, and prove that they admit an underlying quaternionic contact structure, from which we deduce the Ricci curvature. For example, a 3-(α, δ)-Sasaki manifold is Einstein either if α = δ (the 3-α-Sasaki case) or if δ = (2n + 3)α, where dim M = 4n + 3.In the second part we find these adapted connections. We start with a very general notion of φ-compatible connections, where φ denotes any element of the associated sphere of almost contact structures, and make them unique by a certain extra condition, thus yielding the notion of canonical connection (they exist exactly on canonical manifolds, hence the name). For 3-(α, δ)-Sasaki manifolds, we compute the torsion of this connection explicitly and we prove that it is parallel, we describe the holonomy, the ∇-Ricci curvature, and we show that the metric cone is a HKT-manifold. In dimension 7, we construct a cocalibrated G2-structure inducing the canonical connection and we prove the existence of four generalized Killing spinors.

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