On symplectically fat twistor bundles
Maciej Bochenski, Anna Szczepkowska, Aleksy Tralle, Artur Woike
TL;DR
This paper investigates conditions under which twistor bundles over homogeneous spaces are symplectically fat, demonstrating that those over even-dimensional Grassmannians of maximal rank possess this property.
Contribution
It establishes that twistor bundles over even-dimensional Grassmannians of maximal rank are symplectically fat, providing new insights into their geometric structure.
Findings
Twistor bundles over even-dimensional Grassmannians of maximal rank are symplectically fat.
The paper characterizes conditions for symplectic fatness in twistor bundles over homogeneous spaces.
Abstract
This paper deals with the question when are twistor bundles over homogeneous spaces symplectically fat? It shows that twistor bundles over even dimensional Grassmannians of maximal rank have this property.
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