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Turkish Journal of Mathematics

Authors

IRINA GELBUKH

DOI

10.3906/mat-1602-95

Abstract

We study the foliation defined by a closed $1$-form on a connected smooth closed orientable manifold.We call such a foliation compactifiable if all its leaves are closed in the complement of the singular set.In this paper, we give sufficient conditions for compactifiability of the foliation in homological terms.We also show that under these conditions, the foliation can be defined by closed $1$-forms with the ranks of their groups of periods in a certain range.In addition, we describe the structure of the group generated by the homology classes of all compact leaves of the foliation.

Keywords

Closed one-form foliation, compact leaves, form's rank

First Page

1344

Last Page

1353

Included in

Mathematics Commons

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