Abstract
The concept of Faltingsā local-global principle for the minimaxness of local cohomology modules over a commutative Noetherian ring R is introduced, and it is shown that this principle holds at level 2. We also establish the same principle at all levels over an arbitrary commutative Noetherian ring of dimension not exceeding 3. These generalize the main results of Brodmann et al. in [6]. Moreover, it is shown that if M is a finitely generated R-module, \\bmš an ideal of R and r a non-negative integer such that is skinny for all i < r and for some positive integer t, then for any minimax submodule N of , the R-module is finitely generated. As a consequence, it follows that the associated primes of are finite. This generalizes the main results of Brodmann-Lashgari [5] and Quy [16].
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