Regular foliations on weak Fano manifolds
St\'ephane Druel
TL;DR
This paper proves that regular foliations on complex weak Fano manifolds are algebraically integrable, advancing understanding of the structure of such manifolds.
Contribution
It establishes the algebraic integrability of regular foliations specifically on complex weak Fano manifolds, a new result in the field.
Findings
Regular foliations on weak Fano manifolds are algebraically integrable.
Provides new insights into the structure of weak Fano manifolds.
Advances the classification of foliations on complex manifolds.
Abstract
In this paper we prove that a regular foliation on a complex weak Fano manifold is algebraically integrable.
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Taxonomy
TopicsGeometry and complex manifolds · Algebraic Geometry and Number Theory · Geometric Analysis and Curvature Flows