Maryam Jahangiri, Azadeh Nadali, Khadijeh Sayyari: Graded local cohomology modules with respect to the linked ideals, 15-29

Let $R=\oplus_{n\in {\Bbb N}_0}R_n$ be a standard graded ring,

be a finitely generated graded

-module and $R_+:=\oplus_{n\in {\Bbb N}}R_n$ denotes the irrelevant ideal of

. In this paper, considering the new concept of linkage of ideals over a module, we study the graded components $H^i_{\mathfrak{a}}(M)_n$ when ${\mathfrak{a}}$ is an h-linked ideal over

. More precisely, we show that $H^i_{\mathfrak{a}}(M)$ is tame in each of the following cases:

(i)	$i={f_{\mathfrak{a}}^{R_+}}(M)$ , the first integer for which $R_+\nsubseteq \sqrt{0:H^i_{\mathfrak{a}}(M)}$ ;
(ii)	$i={\rm cd}(R_+,M)$ , the last integer for which $H^{i}_{R_+}(M)\neq 0$ , and ${\mathfrak{a}}={\mathfrak{b}}+R_+$ where ${\mathfrak{b}}$ is an h-linked ideal with over .

Also, among other things, we describe the components $H^i_{\mathfrak{a}}(M)_n$ where ${\mathfrak{a}}$ is radically h-

-licci with respect to

of length 2.

Maryam Jahangiri, Azadeh Nadali, Khadijeh Sayyari: Graded local cohomology modules with respect to the linked ideals, 15-29

Abstract: