Let R be a commutative Noetherian ring, � a system of ideals of R and I 2 �. In this paper among other things we prove that if M is finitely generated and t 2 N such that the R-module Hi �(M) is FD≤1 (or weakly Laskerian) for all i < t, then Hi �(M) is �-cofinite for all i < t and for any FD≤0 (or minimax) submodule N of Ht �(M), the R-modules HomR(R/I, Ht �(M)/N) and Ext1 R(R/I, Ht �(M)/N) are finitely generated. Also it is shown that if cd I = 1 or dimM/IM � 1 (e.g., dimR/I � 1) for all I 2 �, then the local cohomology module Hi �(M) is �-cofinite for all i � 0. These generalize the main results of Aghapournahr and Bahmanpour [2], Bahmanpour and Naghipour [6, 7]. Also we study cominimaxness and weakly cofiniteness of local cohomology modules with respect to a system of ideals. 1.
