Reduction of coK\"{a}hler and 3-cosymplectic manifolds
Shuhei Yonehara
TL;DR
This paper develops reduction theorems for coKähler and 3-cosymplectic manifolds, demonstrating their compatibility with cylinder and mapping torus constructions, thus advancing the understanding of their geometric structures.
Contribution
It introduces new reduction theorems for coKähler and 3-cosymplectic manifolds and shows their compatibility with key geometric constructions.
Findings
Reduction theorems for coKähler and 3-cosymplectic manifolds
Compatibility of reductions with cylinder constructions
Compatibility of reductions with mapping torus construction
Abstract
The notions of coK\"{a}hler manifolds and 3-cosymplectic manifolds are odd-dimensional analogues of the ones of K\"{a}hler manifolds and hyperK\"{a}hler manifolds, respectively. In this paper, we obtain reduction theorems of coK\"{a}hler manifolds and 3-cosymplectic manifolds. We show that K\"{a}hler and coK\"{a}hler (hyperK\"{a}hler and 3-cosymplectic) reductions admit a natural compatibility with respect to ``cylinder constructions". We further prove the compatibility of K\"{a}hler and coK\"{a}hler reductions with respect to the "mapping torus construction".
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Taxonomy
TopicsGeometric and Algebraic Topology · Advanced Operator Algebra Research · Geometry and complex manifolds