Fibred Riemannian spaces with quasi Sasakian structure (Q757854)

The author studies a fibred Riemannian space \(\{\tilde M,M,\tilde g,\pi\}\) \((\tilde M\) an m-dimensional total space with projectable Riemannian metric \(\tilde g,\) M an n-dimensional base space, \(\pi: \tilde M\to M\) a projection with maximal rank n) with additional various almost contact metric structures \(\{{\tilde \phi},{\tilde \xi},{\tilde \eta},\tilde g\}\) (\({\tilde \phi}\)- a tensor of type (1,1), \({\tilde \xi}\) a vector field, \({\tilde \eta}\) a 1-form on \(\tilde M\) satisfying the equations \({\tilde \phi}^ 2=-I+{\tilde \xi}\oplus {\tilde \eta},\) \({\tilde \phi}{\tilde \xi}={\tilde \eta},{\tilde \phi}=0,\) \({\tilde \eta}({\tilde \xi})=1,\tilde g({\tilde \phi}\tilde X,\tilde Y)=-\tilde g(\tilde X,{\tilde \phi}\tilde Y),\tilde g(\tilde X,\tilde Y)=\tilde g({\tilde \phi}\tilde X,{\tilde \phi}\tilde Y)+{\tilde \eta}(\tilde X){\tilde \eta}(\tilde Y)).\) Chapter 2 contains characterizations of some structures (nearly or quasi-Sasakian, cosymplectic, cosymplectic space form) on \(\tilde M\) with fibres tangent to \({\tilde \xi}\) in terms of the corresponding structures on the base space M, fibre \(\bar M\) and properties of given tensors and the second fundamental form of the fibres, and the integrability tensor of horizontal distributions. New examples of cosymplectic, Sasakian and quasi-Sasakian structures on Euclidean space \(E^{2n+1}\) are given. Chapter 3 contains characterizations of some structures (quasi-Sasakian, almost, nearly, closely and quasi-cosymplectic) on \(\tilde M\) with invariant fibers normal to \({\tilde \xi}\) in such terms as in chapter 2. In chapter 4 the conditions for the cosymplectic Bochner curvature tensor to vanish are given by means of the \({\tilde \phi}\)-basic or cosymplectic conformal connection.