Some Results about Endomorphism Rings for Local Cohomology Defined by a Pair of Ideals

Abstract

Let (R,m,k) denote a local ring. For I and J ideals of R, for all integer i, let HiI,J(-) denote the i-th local cohomology functor with respect to (I,J). Here we give a generalized version of Local Duality Theorem for local cohomology defined by a pair of ideals. Also, for M be a finitely generated R-module, we study the behavior of the endomorphism rings HtI,J(M) and D(HtI,J(M)) where t is the smallest integer such that the local cohomology with respect to a pair of ideals is non-zero and D(-):= HomR(-,ER(k)) is the Matlis dual functor. We show too that if R be a d-dimensional complete Cohen-Macaulay and HiI,J(R)=0 for all i≠ t, the natural homomorphism R→ HomR(HtI,J(KR), HtI,J(KR)) is an isomorphism and for all i≠ t, where KR denote the canonical module of R.