Symplectic Hodge Theory on Lie Algebroids
Abstract
We explore the natural analogues of the Brylinksi condition, Strong Lefschetz condition, and dδ-lemma in Symplectic Geometry originally explored by Brylinksi, Mathieu, Yan, and Guillemin in the Symplectic Lie Algebroid case. The equivalence of the three conditions is re-established as a purely algebraic statement along with a primitive notion of the dδ-lemma established by Tseng, Yau, and Ho. We then apply this algebraic theory to the desired geometric setting to show that these analogues hold, and finally provide a few classes of examples.
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