Lie algebras of vector fields and codimension one foliations (Q2640949)

Let (M,F) be a foliated manifold. By \({\mathcal X}(M,F)\) denote the Lie algebra of all foliated vector fields on M. The author proves the following result: Let \((M_ 1,F_ 1)\), \((M_ 2,F_ 2)\) be one- codimensional smooth nontrivial foliations of compact manifolds \(M_ 1\), \(M_ 2\). If there exists a Lie algebra isomorphism \(\Phi\) : \({\mathcal X}(M_ 1,F_ 1)\to {\mathcal X}(M_ 2,F_ 2)\) then there is a foliation preserving diffeomorphism \(\phi\) : \(M_ 1\to M_ 2\) such that \(\phi_*=\Phi\).