Cimen, CagrihanPirincci, BeranTastan, Hakan MeteUlusoy, Deniz2025-03-092025-03-0920241307-5624https://doi.org/10.36890/IEJG.1461324https://hdl.handle.net/20.500.12662/4598We study locally conformal Kaehler submersions, i.e., almost Hermitian submersions whose total manifolds are locally conformal Kaehler. We prove that the vertical distribution of a locally conformal Kaehler submersion is totally geodesic iff the Lee vector field of total manifold is vertical. We also obtain the O'Neill tensors A and T with respect to the Weyl connection of a locally conformal Kaehler submersion. Then, we proved that the horizontal distribution of such a submersion is integrable iff A equivalent to 0. Finally, we get Chen-Ricci inequalities for locally conformal Kaehler space form submersions and Hopf space form submersions.eninfo:eu-repo/semantics/openAccessLocally conformal Kaehler manifoldalmost Hermitian submersionHopf space form submersionO'Neill tensorshorizontal distribution.Article10.36890/IEJG.14613245182Q450717WOS:001361568200003N/A