Lorentz \({C}_{12}\)-manifolds (Q6589678)

According to the Chinea-Gonzalez classification of almost contact metric manifolds [\textit{D. Chinea} and \textit{C. Gonzalez}, Ann. Mat. Pura Appl. (4) 156, 15--36 (1990; Zbl 0711.53028)], the class $C_{12}$ contains manifolds that are integrable but not normal.\N\NThe author considers almost contact metric manifolds of class $C_{12}$, equipped with Lorentzian metrics.\NA very important result is that he establishes a criterion for an almost contact Lorentzian manifold to be a Lorentzian $C_{12}$-manifold.\NFour important theorems on Ricci solitons and generalized Ricci solitons on Lorentzian $C_{12}$-manifolds are also proved.