Cominimaxness of local cohomology modules

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“…We are now ready to state and prove the first main theorem of this section. The following theorem is a generalization of [4,11,Proposition 2.6] and [3,27,Proposition 2.4]. In fact, we remove I-torsion condition from these propositions.…”

“…the class of I-cofinite FD ≤1 modules), for all ideals I in a commutative Noetherian ring R. Also in [27] (resp. [3]) it is proved that the same question is true for the category of all I-cominimax R-modules M with dim M ≤ 1 (resp. the class of I-cominimax FD ≤1 modules), for all ideals I in R. In this direction we introduced the concept of I-ET H-cominimax or ET H-cominimax modules with respect to I in Definition 2.1.…”

“…The general local cohomology module H j Φ (M ) is defined to be Φ-cominimax if there exists an ideal I ∈ Φ such that Ext i R (R/I, H j Φ (M )) is minimax, for all i, j ≥ 0. Recently many authors studied the minimaxness and cominimaxness of local cohomology modules and answered the Conjecture 1.1 and Question 1.2 in the class of minimax modules in some cases (see [1,3,9,14,24,27,29]). The purpose of this note is to make a suitable generalization of Conjecture 1.1 and Question 1.2 in terms of minimax modules instead of finitely generated modules for general local cohomology modules.…”

“…it is shown that Hartshorne's question is true for the category of all I-cofinite R-modules M with dim M ≤ 1 (resp. the class of I-cofinite FD ≤1 modules), for all ideals I in a commutative Noetherian ring R. Also in[27] (resp [3]…”

“…Proposition 2.6] and[3,27, Proposition 2.4]. In fact, we remove I-torsion condition from these propositions.…”

Cominimaxness of certain general local cohomology modules

“…We are now ready to state and prove the first main theorem of this section. The following theorem is a generalization of [4,11,Proposition 2.6] and [3,27,Proposition 2.4]. In fact, we remove I-torsion condition from these propositions.…”

“…the class of I-cofinite FD ≤1 modules), for all ideals I in a commutative Noetherian ring R. Also in [27] (resp. [3]) it is proved that the same question is true for the category of all I-cominimax R-modules M with dim M ≤ 1 (resp. the class of I-cominimax FD ≤1 modules), for all ideals I in R. In this direction we introduced the concept of I-ET H-cominimax or ET H-cominimax modules with respect to I in Definition 2.1.…”

“…The general local cohomology module H j Φ (M ) is defined to be Φ-cominimax if there exists an ideal I ∈ Φ such that Ext i R (R/I, H j Φ (M )) is minimax, for all i, j ≥ 0. Recently many authors studied the minimaxness and cominimaxness of local cohomology modules and answered the Conjecture 1.1 and Question 1.2 in the class of minimax modules in some cases (see [1,3,9,14,24,27,29]). The purpose of this note is to make a suitable generalization of Conjecture 1.1 and Question 1.2 in terms of minimax modules instead of finitely generated modules for general local cohomology modules.…”

“…it is shown that Hartshorne's question is true for the category of all I-cofinite R-modules M with dim M ≤ 1 (resp. the class of I-cofinite FD ≤1 modules), for all ideals I in a commutative Noetherian ring R. Also in[27] (resp [3]…”

“…Proposition 2.6] and[3,27, Proposition 2.4]. In fact, we remove I-torsion condition from these propositions.…”

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