As a generalization of semi-invariant Riemannian submersions, we introduce conformal semi-invariant submersions from almost contact metric manifolds onto Riemannian manifolds and study such submersions from Cosymplectic manifolds onto Riemannian manifolds. Examples of conformal semi-invariant submersions in which structure vector field is vertical are given. We study geometry of foliations determined by distributions involved in definition of conformal anti-invariant submersions. We also study the harmonicity of such submersions and find necessary and sufficient conditions for the distributions to be totally geodesic.
Prasad, R., & Kumar, S. (2019). Conformal Semi-Invariant Submersions from Almost Contact Metric Manifolds onto Riemannian Manifolds. Khayyam Journal of Mathematics, 5(2), 77-95. doi: 10.22034/kjm.2018.68796
MLA
Rajendra Prasad; Sushil Kumar. "Conformal Semi-Invariant Submersions from Almost Contact Metric Manifolds onto Riemannian Manifolds". Khayyam Journal of Mathematics, 5, 2, 2019, 77-95. doi: 10.22034/kjm.2018.68796
HARVARD
Prasad, R., Kumar, S. (2019). 'Conformal Semi-Invariant Submersions from Almost Contact Metric Manifolds onto Riemannian Manifolds', Khayyam Journal of Mathematics, 5(2), pp. 77-95. doi: 10.22034/kjm.2018.68796
VANCOUVER
Prasad, R., Kumar, S. Conformal Semi-Invariant Submersions from Almost Contact Metric Manifolds onto Riemannian Manifolds. Khayyam Journal of Mathematics, 2019; 5(2): 77-95. doi: 10.22034/kjm.2018.68796