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On an endomorphism ring of local cohomology
Majid Eghbali
IPMNovember 30, 2011
It is based on a joint work with Peter Schenzel8th Seminar on Commutative Algebra and Related Topics
Majid Eghbali On an endomorphism ring of local cohomology
Why local cohomolgy
Local cohomology was invented by Grothendieck in 1960s toprove some theorems in algebraic geometry. It has manyapplications in topology, geometry, combinatorics, andcomputational subjects.
DefinitionLet M be an R-module and a an ideal of R, then we define i-thlocal cohomology module as H i
a(M) = lim−→ExtiR(R/an, M).
Majid Eghbali On an endomorphism ring of local cohomology
Why local cohomolgy
Local cohomology was invented by Grothendieck in 1960s toprove some theorems in algebraic geometry. It has manyapplications in topology, geometry, combinatorics, andcomputational subjects.
DefinitionLet M be an R-module and a an ideal of R, then we define i-thlocal cohomology module as H i
a(M) = lim−→ExtiR(R/an, M).
Majid Eghbali On an endomorphism ring of local cohomology
Why local cohomolgy
Local cohomology was invented by Grothendieck in 1960s toprove some theorems in algebraic geometry. It has manyapplications in topology, geometry, combinatorics, andcomputational subjects.
DefinitionLet M be an R-module and a an ideal of R, then we define i-thlocal cohomology module as H i
a(M) = lim−→ExtiR(R/an, M).
Majid Eghbali On an endomorphism ring of local cohomology
Resent Work
Hochster-Huneke (1994)
HomR(Hdm(R), Hd
m(R)), where d := dim R and (R,m) local ring.
Hellus-Stückrad (2007), Hellus-Schenzel(2008),Schenzel(2009)
HomR(H ia(R), H i
a(R)), where i := height of a.
Eghbali- Schenzel(2011)
HomR(Hda (R), Hd
a (R)), where d := dim R.
Majid Eghbali On an endomorphism ring of local cohomology
Resent Work
Hochster-Huneke (1994)
HomR(Hdm(R), Hd
m(R)), where d := dim R and (R,m) local ring.
Hellus-Stückrad (2007), Hellus-Schenzel(2008),Schenzel(2009)
HomR(H ia(R), H i
a(R)), where i := height of a.
Eghbali- Schenzel(2011)
HomR(Hda (R), Hd
a (R)), where d := dim R.
Majid Eghbali On an endomorphism ring of local cohomology
Resent Work
Hochster-Huneke (1994)
HomR(Hdm(R), Hd
m(R)), where d := dim R and (R,m) local ring.
Hellus-Stückrad (2007), Hellus-Schenzel(2008),Schenzel(2009)
HomR(H ia(R), H i
a(R)), where i := height of a.
Eghbali- Schenzel(2011)
HomR(Hda (R), Hd
a (R)), where d := dim R.
Majid Eghbali On an endomorphism ring of local cohomology
Resent Work
Hochster-Huneke (1994)
HomR(Hdm(R), Hd
m(R)), where d := dim R and (R,m) local ring.
Hellus-Stückrad (2007), Hellus-Schenzel(2008),Schenzel(2009)
HomR(H ia(R), H i
a(R)), where i := height of a.
Eghbali- Schenzel(2011)
HomR(Hda (R), Hd
a (R)), where d := dim R.
Majid Eghbali On an endomorphism ring of local cohomology
Questions
Some questions in local cohomology
Let a be an ideal of a local ring (R,m) and ER(R/m) be theinjective hull of the residue field R/m and M a finitely generatedR-module of dimension d:
1 How one can express Hda (M) via Hd
m(M).2 What are the properties of HomR(Hdim R
a (R), ER(R/m)).3 What are the properties of HomR̂(Hdim R
a (R), Hdim Ra (R)).
4 What are some applications of the above questions?
Majid Eghbali On an endomorphism ring of local cohomology
Questions
Some questions in local cohomology
Let a be an ideal of a local ring (R,m) and ER(R/m) be theinjective hull of the residue field R/m and M a finitely generatedR-module of dimension d:
1 How one can express Hda (M) via Hd
m(M).2 What are the properties of HomR(Hdim R
a (R), ER(R/m)).3 What are the properties of HomR̂(Hdim R
a (R), Hdim Ra (R)).
4 What are some applications of the above questions?
Majid Eghbali On an endomorphism ring of local cohomology
Questions
Some questions in local cohomology
Let a be an ideal of a local ring (R,m) and ER(R/m) be theinjective hull of the residue field R/m and M a finitely generatedR-module of dimension d:
1 How one can express Hda (M) via Hd
m(M).2 What are the properties of HomR(Hdim R
a (R), ER(R/m)).3 What are the properties of HomR̂(Hdim R
a (R), Hdim Ra (R)).
4 What are some applications of the above questions?
Majid Eghbali On an endomorphism ring of local cohomology
Questions
Some questions in local cohomology
Let a be an ideal of a local ring (R,m) and ER(R/m) be theinjective hull of the residue field R/m and M a finitely generatedR-module of dimension d:
1 How one can express Hda (M) via Hd
m(M).2 What are the properties of HomR(Hdim R
a (R), ER(R/m)).3 What are the properties of HomR̂(Hdim R
a (R), Hdim Ra (R)).
4 What are some applications of the above questions?
Majid Eghbali On an endomorphism ring of local cohomology
Questions
Some questions in local cohomology
Let a be an ideal of a local ring (R,m) and ER(R/m) be theinjective hull of the residue field R/m and M a finitely generatedR-module of dimension d:
1 How one can express Hda (M) via Hd
m(M).2 What are the properties of HomR(Hdim R
a (R), ER(R/m)).3 What are the properties of HomR̂(Hdim R
a (R), Hdim Ra (R)).
4 What are some applications of the above questions?
Majid Eghbali On an endomorphism ring of local cohomology
Questions
Some questions in local cohomology
Let a be an ideal of a local ring (R,m) and ER(R/m) be theinjective hull of the residue field R/m and M a finitely generatedR-module of dimension d:
1 How one can express Hda (M) via Hd
m(M).2 What are the properties of HomR(Hdim R
a (R), ER(R/m)).3 What are the properties of HomR̂(Hdim R
a (R), Hdim Ra (R)).
4 What are some applications of the above questions?
Majid Eghbali On an endomorphism ring of local cohomology
To Control top local cohomology
Express Hda (M) via Hd
m(M).
Explanation
Put d := dim M. When Hda (M) 6= 0 one of the most important
views concerning this is to express Hda (M) via Hd
m(M). Moreprecisely the kernel of the natural epimorphismHdim Mm (M)→ Hdim M
a (M) has been calculated explicitly.
NoteFor an R-module M let 0 = ∩n
i=1Qi(M) denote a minimalprimary decomposition of the zero submodule of M. That isM/Qi(M), i = 1, ..., n, is a pi -primary R-module. ClearlyAssR M = {p1, ..., pn}.
Majid Eghbali On an endomorphism ring of local cohomology
To Control top local cohomology
Express Hda (M) via Hd
m(M).
Explanation
Put d := dim M. When Hda (M) 6= 0 one of the most important
views concerning this is to express Hda (M) via Hd
m(M). Moreprecisely the kernel of the natural epimorphismHdim Mm (M)→ Hdim M
a (M) has been calculated explicitly.
NoteFor an R-module M let 0 = ∩n
i=1Qi(M) denote a minimalprimary decomposition of the zero submodule of M. That isM/Qi(M), i = 1, ..., n, is a pi -primary R-module. ClearlyAssR M = {p1, ..., pn}.
Majid Eghbali On an endomorphism ring of local cohomology
To Control top local cohomology
Express Hda (M) via Hd
m(M).
Explanation
Put d := dim M. When Hda (M) 6= 0 one of the most important
views concerning this is to express Hda (M) via Hd
m(M). Moreprecisely the kernel of the natural epimorphismHdim Mm (M)→ Hdim M
a (M) has been calculated explicitly.
NoteFor an R-module M let 0 = ∩n
i=1Qi(M) denote a minimalprimary decomposition of the zero submodule of M. That isM/Qi(M), i = 1, ..., n, is a pi -primary R-module. ClearlyAssR M = {p1, ..., pn}.
Majid Eghbali On an endomorphism ring of local cohomology
Some Definitions
DefinitionLet a ⊂ R denote an ideal of R. We define two disjoint subsetsU, V of AssR M related to a
(a) U = {p ∈ AssR M|dim R/p = d and dim R/a + p = 0}.(b) V = {p ∈ AssR M|dim R/p < d or dim R/p =
d and dim R/a + p > 0}.Finally we define Qa(M) = ∩pi∈UQi(M). In the case U = ∅, putQa(M) = M.
DefinitionLet M denote a finitely generated module over the local ring(R,m). Let a ⊂ R denote an ideal. Then define Pa(M) as theintersection of all the primary components of AnnR M such thatdim R/p = dim M and dim R/a + p = 0. Clearly Pa(M) is thepre-image of QaR/ AnnR M(R/ AnnR M) in R.
Majid Eghbali On an endomorphism ring of local cohomology
Some Definitions
DefinitionLet a ⊂ R denote an ideal of R. We define two disjoint subsetsU, V of AssR M related to a
(a) U = {p ∈ AssR M|dim R/p = d and dim R/a + p = 0}.(b) V = {p ∈ AssR M|dim R/p < d or dim R/p =
d and dim R/a + p > 0}.Finally we define Qa(M) = ∩pi∈UQi(M). In the case U = ∅, putQa(M) = M.
DefinitionLet M denote a finitely generated module over the local ring(R,m). Let a ⊂ R denote an ideal. Then define Pa(M) as theintersection of all the primary components of AnnR M such thatdim R/p = dim M and dim R/a + p = 0. Clearly Pa(M) is thepre-image of QaR/ AnnR M(R/ AnnR M) in R.
Majid Eghbali On an endomorphism ring of local cohomology
Main Theorem
TheoremLet a denote an ideal of a local ring (R,m). Let M be a finitelygenerated R-module and d = dim M. Then there is a naturalisomorphism
Hda (M) ∼= Hd
mR̂(M̂/Q
aR̂(M̂)) ∼= HdmR̂
(M̂/Pa(M̂)M̂).
ProofUsing the short exact sequence
0→ Qa(M)→ M → M/Qa(M)→ 0
and applying local cohomology module to it we prove the claim.to this end note that AssR Qa(M) = V , AssR M/Qa(M) = U andU ∪ V = AssR M.
Majid Eghbali On an endomorphism ring of local cohomology
Main Theorem
TheoremLet a denote an ideal of a local ring (R,m). Let M be a finitelygenerated R-module and d = dim M. Then there is a naturalisomorphism
Hda (M) ∼= Hd
mR̂(M̂/Q
aR̂(M̂)) ∼= HdmR̂
(M̂/Pa(M̂)M̂).
ProofUsing the short exact sequence
0→ Qa(M)→ M → M/Qa(M)→ 0
and applying local cohomology module to it we prove the claim.to this end note that AssR Qa(M) = V , AssR M/Qa(M) = U andU ∪ V = AssR M.
Majid Eghbali On an endomorphism ring of local cohomology
Homological Properties of HomR(Hda (R), ER(R/m))
NotationFor an ideal a ⊂ R with dim R/a = d we will denote by ad theintersection of those primary components in a minimal reducedprimary decomposition of a which are of dimension d .
Notation and DefinitionFor a local ring (R,m) which is a factor ring of a Gorenstein ring(S, n) with r = dim S. Then there are functorial isomorphisms
Hdm(M) ∼= HomR(Extr−d
S (M, S), E(R/m)), d := dim M,
where M is a finitely generated R-module. The moduleKM = Extr−d
S (M, S) is called the canonical module of M.
Majid Eghbali On an endomorphism ring of local cohomology
Homological Properties of HomR(Hda (R), ER(R/m))
NotationFor an ideal a ⊂ R with dim R/a = d we will denote by ad theintersection of those primary components in a minimal reducedprimary decomposition of a which are of dimension d .
Notation and DefinitionFor a local ring (R,m) which is a factor ring of a Gorenstein ring(S, n) with r = dim S. Then there are functorial isomorphisms
Hdm(M) ∼= HomR(Extr−d
S (M, S), E(R/m)), d := dim M,
where M is a finitely generated R-module. The moduleKM = Extr−d
S (M, S) is called the canonical module of M.
Majid Eghbali On an endomorphism ring of local cohomology
Homological Properties of HomR(Hda (R), ER(R/m))
NotationFor an ideal a ⊂ R with dim R/a = d we will denote by ad theintersection of those primary components in a minimal reducedprimary decomposition of a which are of dimension d .
Notation and DefinitionFor a local ring (R,m) which is a factor ring of a Gorenstein ring(S, n) with r = dim S. Then there are functorial isomorphisms
Hdm(M) ∼= HomR(Extr−d
S (M, S), E(R/m)), d := dim M,
where M is a finitely generated R-module. The moduleKM = Extr−d
S (M, S) is called the canonical module of M.
Majid Eghbali On an endomorphism ring of local cohomology
Applications
LemmaLet a denote an ideal in a d-dimensional local ring (R,m). Then(1) Ta(R) = HomR(Hd
a (R), ER(R/m)) is a finitely generatedR̂-module.
(2) AssR̂ Ta(R) = {p ∈ Ass R̂|dim R̂/p =
dim R and dim R̂/aR̂ + p = 0}.(3) KR̂(R̂/Qa(R̂)) ∼= Ta(R). In particular, It satisfies the S2
condition. Furthermore when R̂/Qa(R̂) is Cohen-Macaulaythen so is Ta(R).
Majid Eghbali On an endomorphism ring of local cohomology
Applications
LemmaLet a denote an ideal in a d-dimensional local ring (R,m). Then(1) Ta(R) = HomR(Hd
a (R), ER(R/m)) is a finitely generatedR̂-module.
(2) AssR̂ Ta(R) = {p ∈ Ass R̂|dim R̂/p =
dim R and dim R̂/aR̂ + p = 0}.(3) KR̂(R̂/Qa(R̂)) ∼= Ta(R). In particular, It satisfies the S2
condition. Furthermore when R̂/Qa(R̂) is Cohen-Macaulaythen so is Ta(R).
Majid Eghbali On an endomorphism ring of local cohomology
Applications
Lemma
(4) AnnR̂(Hda (R)) = Qa(R̂).
TheoremLet a denote an ideal in a local ring (R,m). Let
Φ : R̂ → HomR̂(Hda (R), Hd
a (R))
the natural homomorphism. Then(1) ker Φ = Q
aR̂(R̂).
(2) Φ is surjective if and only if R̂/QaR̂(R̂) satisfies S2.
(3) HomR̂(Hda (R), Hd
a (R)) is a finitely generated R̂-module.
(4) HomR̂(Hda (R), Hd
a (R)) is a commutative semi-localNoetherian ring.
Majid Eghbali On an endomorphism ring of local cohomology
Applications
Lemma
(4) AnnR̂(Hda (R)) = Qa(R̂).
TheoremLet a denote an ideal in a local ring (R,m). Let
Φ : R̂ → HomR̂(Hda (R), Hd
a (R))
the natural homomorphism. Then(1) ker Φ = Q
aR̂(R̂).
(2) Φ is surjective if and only if R̂/QaR̂(R̂) satisfies S2.
(3) HomR̂(Hda (R), Hd
a (R)) is a finitely generated R̂-module.
(4) HomR̂(Hda (R), Hd
a (R)) is a commutative semi-localNoetherian ring.
Majid Eghbali On an endomorphism ring of local cohomology
Applications
Lemma
(4) AnnR̂(Hda (R)) = Qa(R̂).
TheoremLet a denote an ideal in a local ring (R,m). Let
Φ : R̂ → HomR̂(Hda (R), Hd
a (R))
the natural homomorphism. Then(1) ker Φ = Q
aR̂(R̂).
(2) Φ is surjective if and only if R̂/QaR̂(R̂) satisfies S2.
(3) HomR̂(Hda (R), Hd
a (R)) is a finitely generated R̂-module.
(4) HomR̂(Hda (R), Hd
a (R)) is a commutative semi-localNoetherian ring.
Majid Eghbali On an endomorphism ring of local cohomology
Applications
TheoremLet a be an ideal of a complete local ring (R,m). For an integerr ≥ 2 we have the following statements:(1) Suppose R/Qa(R) has S2. Then Ta(R) satisfies the
condition Sr if and only if H im(R/Qa(R)) = 0 for
d − r + 2 ≤ i < d .
(2) R/Qa(R) satisfies the condition Sr if and only ifH im(Ta(R)) = 0 for d − r + 2 ≤ i < d and
R/Qa(R) ∼= HomR(Hda (R), Hd
a (R)).
In particular, if R/Qa(R) has S2 it is a Cohen-Macaulay ring ifand only if the module Ta(R) is Cohen-Macaulay.
Majid Eghbali On an endomorphism ring of local cohomology
Applications
TheoremLet a be an ideal of a complete local ring (R,m). For an integerr ≥ 2 we have the following statements:(1) Suppose R/Qa(R) has S2. Then Ta(R) satisfies the
condition Sr if and only if H im(R/Qa(R)) = 0 for
d − r + 2 ≤ i < d .
(2) R/Qa(R) satisfies the condition Sr if and only ifH im(Ta(R)) = 0 for d − r + 2 ≤ i < d and
R/Qa(R) ∼= HomR(Hda (R), Hd
a (R)).
In particular, if R/Qa(R) has S2 it is a Cohen-Macaulay ring ifand only if the module Ta(R) is Cohen-Macaulay.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
HartshorneLet (R,m) denote a local ring such that depth R ≥ 2. ThenSpec R \ {m} is connected in Zariski topology.
Example
Let R := k [x , y , u, v ]/((x , y) ∩ (u, v)). Then R is a twodimensional ring such that Spec R \ {m} is disconnected. ThenR can not be Cohen-Macaulay ring.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
HartshorneLet (R,m) denote a local ring such that depth R ≥ 2. ThenSpec R \ {m} is connected in Zariski topology.
Example
Let R := k [x , y , u, v ]/((x , y) ∩ (u, v)). Then R is a twodimensional ring such that Spec R \ {m} is disconnected. ThenR can not be Cohen-Macaulay ring.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
HartshorneLet (R,m) denote a local ring such that depth R ≥ 2. ThenSpec R \ {m} is connected in Zariski topology.
Example
Let R := k [x , y , u, v ]/((x , y) ∩ (u, v)). Then R is a twodimensional ring such that Spec R \ {m} is disconnected. ThenR can not be Cohen-Macaulay ring.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
DefinitionLet (R,m) denote a local ring. We denote by G(R) theundirected graph whose vertices are primes p ∈ Spec R suchthat dim R = dim R/p, and two distinct vertices p, q are joinedby an edge if and only if (p, q) is an ideal of height one.
Proposition
Let (R,m) denote a local ring and d = dim R. Then thefollowing conditions are equivalent:(1) The graph G(R) is connected.(2) Spec R/0d is connected in codimension one.(3) For every ideal JR/0d of height at least two,
Spec(R/0d ) \ V (JR/0d ) is connected.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
DefinitionLet (R,m) denote a local ring. We denote by G(R) theundirected graph whose vertices are primes p ∈ Spec R suchthat dim R = dim R/p, and two distinct vertices p, q are joinedby an edge if and only if (p, q) is an ideal of height one.
Proposition
Let (R,m) denote a local ring and d = dim R. Then thefollowing conditions are equivalent:(1) The graph G(R) is connected.(2) Spec R/0d is connected in codimension one.(3) For every ideal JR/0d of height at least two,
Spec(R/0d ) \ V (JR/0d ) is connected.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
DefinitionLet (R,m) denote a local ring. We denote by G(R) theundirected graph whose vertices are primes p ∈ Spec R suchthat dim R = dim R/p, and two distinct vertices p, q are joinedby an edge if and only if (p, q) is an ideal of height one.
Proposition
Let (R,m) denote a local ring and d = dim R. Then thefollowing conditions are equivalent:(1) The graph G(R) is connected.(2) Spec R/0d is connected in codimension one.(3) For every ideal JR/0d of height at least two,
Spec(R/0d ) \ V (JR/0d ) is connected.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
Hochster-HunekeLet (R,m) be a complete local equidimensional ring andd = dim R. Then the following conditions are equivalent:(1) Hd
m(R) is indecomposable.(2) KR, the canonical module of R is indecomposable.(3) The ring HomR(KR, KR) is local.(4) For every ideal J of height at least two, Spec(R) \ V (J) is
connected.(5) The graph G(R) is connected.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
Hochster-HunekeLet (R,m) be a complete local equidimensional ring andd = dim R. Then the following conditions are equivalent:(1) Hd
m(R) is indecomposable.(2) KR, the canonical module of R is indecomposable.(3) The ring HomR(KR, KR) is local.(4) For every ideal J of height at least two, Spec(R) \ V (J) is
connected.(5) The graph G(R) is connected.
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
The extension of Hochster-Huneke TheoremLet (R,m) denote a complete local ring and d = dim R. For anideal a ⊂ R the following conditions are equivalent:(1) Hd
a (R) is indecomposable.(2) HomR(Hd
a (R), E(R/m)) is indecomposable.(3) The endomorphism ring of Hd
a (R) is a local ring.(4) The graph G(R/Qa(R)) is connected,
Majid Eghbali On an endomorphism ring of local cohomology
Some connectedness results
The extension of Hochster-Huneke TheoremLet (R,m) denote a complete local ring and d = dim R. For anideal a ⊂ R the following conditions are equivalent:(1) Hd
a (R) is indecomposable.(2) HomR(Hd
a (R), E(R/m)) is indecomposable.(3) The endomorphism ring of Hd
a (R) is a local ring.(4) The graph G(R/Qa(R)) is connected,
Majid Eghbali On an endomorphism ring of local cohomology
Number of connected components
NotationWe describe t , the number of connected components ofG(R/Qa(R)).
DefinitionA connected component of an undirected graph is a subgraphin which any two vertices are connected to each other by paths,and which is connected to no additional vertices.
Majid Eghbali On an endomorphism ring of local cohomology
Number of connected components
NotationWe describe t , the number of connected components ofG(R/Qa(R)).
DefinitionA connected component of an undirected graph is a subgraphin which any two vertices are connected to each other by paths,and which is connected to no additional vertices.
Majid Eghbali On an endomorphism ring of local cohomology
Number of connected components
NotationWe describe t , the number of connected components ofG(R/Qa(R)).
DefinitionA connected component of an undirected graph is a subgraphin which any two vertices are connected to each other by paths,and which is connected to no additional vertices.
Majid Eghbali On an endomorphism ring of local cohomology
Number of connected components
DefinitionLet a be an ideal in a local ring (R,m). Suppose that Q = Qa(R)is a proper ideal. Let Gi , i = 1, . . . , t , denote the connectedcomponents of G(R/Q). Let Qi , i = 1, . . . , t , denote theintersection of all p-primary components of a reduced minimalprimary decomposition of Q such that p ∈ Gi . Then Q = ∩t
i=1Qiand G(R/Qi) = Gi , i = 1, . . . , t , is connected. Moreover, letai , i = 1, . . . , t , denote the image of the ideal a in R/Qi .
Majid Eghbali On an endomorphism ring of local cohomology
Number of connected components
DefinitionLet a be an ideal in a local ring (R,m). Suppose that Q = Qa(R)is a proper ideal. Let Gi , i = 1, . . . , t , denote the connectedcomponents of G(R/Q). Let Qi , i = 1, . . . , t , denote theintersection of all p-primary components of a reduced minimalprimary decomposition of Q such that p ∈ Gi . Then Q = ∩t
i=1Qiand G(R/Qi) = Gi , i = 1, . . . , t , is connected. Moreover, letai , i = 1, . . . , t , denote the image of the ideal a in R/Qi .
Majid Eghbali On an endomorphism ring of local cohomology
Number of connected components
TheoremLet a denote an ideal of a complete local ring (R,m) withd = dim R ≥ 2. Then
End Hda (R) ' End Hd
a1(R/Q1)× . . .× End Hd
at(R/Qt )
is a semi-local ring, End Hdai
(R/Qi), i = 1, . . . , t , is a local ringand therefore t is equal to the number of maximal ideals ofEnd Hd
a (R).
Majid Eghbali On an endomorphism ring of local cohomology
Number of connected components
TheoremLet a denote an ideal of a complete local ring (R,m) withd = dim R ≥ 2. Then
End Hda (R) ' End Hd
a1(R/Q1)× . . .× End Hd
at(R/Qt )
is a semi-local ring, End Hdai
(R/Qi), i = 1, . . . , t , is a local ringand therefore t is equal to the number of maximal ideals ofEnd Hd
a (R).
Majid Eghbali On an endomorphism ring of local cohomology
THANK YOU VERY MUCH
Majid Eghbali On an endomorphism ring of local cohomology
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