Abstract
In this article, total geodesic submanifolds for Lorentz-Sasakian space forms are investigated. For these submanifolds, pseudoparallel, 2-pseudoparallel, Ricci generalized pseudoparallel and 2-Ricci generalized pseudoparallel invariant submanifolds have been studied and many new results have been obtained. In addition, necessary and sufficient conditions have been obtained for these submanifolds to be total geodesic on the concircular and projective curvature tensors.