Abstract
On the basis of a result of Barrett [2], we show that members of certain classes of abstract Levi flat manifolds with boundary, whose Levi foliation contains a compact leaf with contracting, flat holonomy, admit no $\mathit{CR}$ embedding as a hypersurface of a complex manifold. In particular, it follows that the foliation constructed in [6] is not embeddable.
Citation
Giuseppe Della Sala. "Non-embeddability of certain classes of Levi flat manifolds." Osaka J. Math. 51 (1) 161 - 171, January 2014.
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