graded blocks of group algebras - university of leicester · 2014-09-12 · any two brauer tree...

Graded Blocks of Group Algebras

Dusko Bogdanic

Mathematical InstituteUniversity of Oxford

University of Leicester, 21 June 2010

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 1 / 27

Motivation

Theorem (Rouquier, 2001)

Let Db(A-mod) ∼= Db(B-mod). If A is graded, then B is graded.

Problem

How do we effectively transfer gradings between derived equivalentalgebras A and B?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 2 / 27

Motivation

Theorem (Rouquier, 2001)

Let Db(A-mod) ∼= Db(B-mod). If A is graded, then B is graded.

Problem

How do we effectively transfer gradings between derived equivalentalgebras A and B?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 2 / 27

Motivation

Theorem (Rouquier, 2001)

Let Db(A-mod) ∼= Db(B-mod). If A is graded, then B is graded.

Problem

How do we effectively transfer gradings between derived equivalentalgebras A and B?

If the grading on A has some interesting properties, does the resultinggrading on B has the same properties?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 3 / 27

Overview

1 Preliminaries

I Brauer tree algebras

I Graded algebras

2 The tilting complex

3 Example

4 The general case

5 Properties of the resulting grading

6 Classification of gradings

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 4 / 27

Brauer tree algebras

Γ finite connected tree with e edges.

Γ is a Brauer tree of type (m, e) if given:

I Cyclic ordering of the edges adjacent to a given vertex,

I The exceptional vertex v , to whom we assign the multiplicity m.

◦S4

~~~~~~~

◦ S1 ◦ S2 •S3

@@@@@@@

◦

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 5 / 27

Brauer tree algebras

Γ finite connected tree with e edges.

Γ is a Brauer tree of type (m, e) if given:

I Cyclic ordering of the edges adjacent to a given vertex,

I The exceptional vertex v , to whom we assign the multiplicity m.

◦S4

~~~~~~~

◦ S1 ◦ S2 •S3

@@@@@@@

◦

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 5 / 27

Brauer tree algebrasA is a Brauer tree algebra associated with Γ if

I the isomorphism classes of simple A-modules are in one-to-onecorrespondence with the edges of Γ,

I Let a part of Γ be

◦ ◦

◦ S

V1

@@@@@@@

Vt�������•

Ur�������

U1 @@@@@@@

◦ ◦

The structure of PS is given by

PS =S

V US

I V V1,V2, . . . ,Vt ,I U U1,U2, . . . ,Ur ; S ,U1,U2, . . . ,Ur ; . . . ; S ,U1,U2, . . . ,Ur .

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 6 / 27

Brauer tree algebrasA is a Brauer tree algebra associated with Γ if

I the isomorphism classes of simple A-modules are in one-to-onecorrespondence with the edges of Γ,

I Let a part of Γ be

◦ ◦

◦ S

V1

@@@@@@@

Vt�������•

Ur�������

U1 @@@@@@@

◦ ◦

The structure of PS is given by

PS =S

V US

I V V1,V2, . . . ,Vt ,I U U1,U2, . . . ,Ur ; S ,U1,U2, . . . ,Ur ; . . . ; S ,U1,U2, . . . ,Ur .

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 6 / 27

Brauer tree algebrasA is a Brauer tree algebra associated with Γ if

I the isomorphism classes of simple A-modules are in one-to-onecorrespondence with the edges of Γ,

I Let a part of Γ be

◦ ◦

◦ S

V1

@@@@@@@

Vt�������•

Ur�������

U1 @@@@@@@

◦ ◦

The structure of PS is given by

PS =S

V US

I V V1,V2, . . . ,Vt ,I U U1,U2, . . . ,Ur ; S ,U1,U2, . . . ,Ur ; . . . ; S ,U1,U2, . . . ,Ur .

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 6 / 27

Brauer tree algebrasA is a Brauer tree algebra associated with Γ if

I the isomorphism classes of simple A-modules are in one-to-onecorrespondence with the edges of Γ,

I Let a part of Γ be

◦ ◦

◦ S

V1

@@@@@@@

Vt�������•

Ur�������

U1 @@@@@@@

◦ ◦

The structure of PS is given by

PS =S

V US

I V V1,V2, . . . ,Vt ,

I U U1,U2, . . . ,Ur ; S ,U1,U2, . . . ,Ur ; . . . ; S ,U1,U2, . . . ,Ur .

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 6 / 27

Brauer tree algebrasA is a Brauer tree algebra associated with Γ if

I the isomorphism classes of simple A-modules are in one-to-onecorrespondence with the edges of Γ,

I Let a part of Γ be

◦ ◦

◦ S

V1

@@@@@@@

Vt�������•

Ur�������

U1 @@@@@@@

◦ ◦

The structure of PS is given by

PS =S

V US

I V V1,V2, . . . ,Vt ,I U U1,U2, . . . ,Ur ; S ,U1,U2, . . . ,Ur ; . . . ; S ,U1,U2, . . . ,Ur .

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 6 / 27

Brauer tree algebras

Γ is of type (2, 4)

◦S4

~~~~~~~

◦ S1 ◦ S2 •S3

@@@@@@@

◦

PS1 =S1

S2

S1

, PS2 =

S2

S3

S4

S1 S2

S3

S4

S2

, PS3 =

S3

S4

S2

S3

S4

S2

S3

.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 7 / 27

Brauer tree algebras

Γ is of type (2, 4)

◦S4

~~~~~~~

◦ S1 ◦ S2 •S3

@@@@@@@

◦

PS1 =S1

S2

S1

, PS2 =

S2

S3

S4

S1 S2

S3

S4

S2

, PS3 =

S3

S4

S2

S3

S4

S2

S3

.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 7 / 27

Brauer tree algebras

The Brauer star of type (m, e)

◦ ◦

◦ •

S2~~~~~~~ S1

S6

@@@@@@@

S3

@@@@@@@

S4

S5~~~~~~~◦

◦ ◦

The projective indecomposable module Pj is uniserial.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 8 / 27

Brauer tree algebras

The Brauer star of type (m, e)

◦ ◦

◦ •

S2~~~~~~~ S1

S6

@@@@@@@

S3

@@@@@@@

S4

S5~~~~~~~◦

◦ ◦

The projective indecomposable module Pj is uniserial.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 8 / 27

Brauer tree algebras

Any two Brauer tree algebras associated with the same Brauer tree Γand defined over the same field k are Morita equivalent.

A basic Brauer tree algebra corresponding to a Brauer tree Γ isisomorphic to the algebra kQ/I .

Q and I are easily constructed from Γ.

AΓ := kQ/I

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 9 / 27

Brauer tree algebras

Any two Brauer tree algebras associated with the same Brauer tree Γand defined over the same field k are Morita equivalent.

A basic Brauer tree algebra corresponding to a Brauer tree Γ isisomorphic to the algebra kQ/I .

Q and I are easily constructed from Γ.

AΓ := kQ/I

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 9 / 27

Graded algebras

Definition

A is a graded algebra if A is the direct sum of subspaces A =⊕

i∈Z Ai ,such that AiAj ⊂ Ai+j , i , j ∈ Z.

ai ∈ Ai deg(ai ) = i

If Ai = 0 for i < 0, then A is positively graded.

Definition

An A-module M is graded if M =⊕

i∈Z Mi , and AiMj ⊂ Mi+j .

N = M〈n〉 denotes the graded module given by Nj = Mn+j , j ∈ Z.

Definition

An A-module homomorphism f between two graded modules M and N isa homomorphism of graded modules if f (Mi ) ⊆ Ni , for all i ∈ Z.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 10 / 27

Graded algebras

Definition

A is a graded algebra if A is the direct sum of subspaces A =⊕

i∈Z Ai ,such that AiAj ⊂ Ai+j , i , j ∈ Z.

ai ∈ Ai deg(ai ) = i

If Ai = 0 for i < 0, then A is positively graded.

Definition

An A-module M is graded if M =⊕

i∈Z Mi , and AiMj ⊂ Mi+j .

N = M〈n〉 denotes the graded module given by Nj = Mn+j , j ∈ Z.

Definition

An A-module homomorphism f between two graded modules M and N isa homomorphism of graded modules if f (Mi ) ⊆ Ni , for all i ∈ Z.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 10 / 27

Graded algebras

Definition

A is a graded algebra if A is the direct sum of subspaces A =⊕

i∈Z Ai ,such that AiAj ⊂ Ai+j , i , j ∈ Z.

ai ∈ Ai deg(ai ) = i

If Ai = 0 for i < 0, then A is positively graded.

Definition

An A-module M is graded if M =⊕

i∈Z Mi , and AiMj ⊂ Mi+j .

N = M〈n〉 denotes the graded module given by Nj = Mn+j , j ∈ Z.

Definition

An A-module homomorphism f between two graded modules M and N isa homomorphism of graded modules if f (Mi ) ⊆ Ni , for all i ∈ Z.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 10 / 27

Graded algebras

Definition

A is a graded algebra if A is the direct sum of subspaces A =⊕

i∈Z Ai ,such that AiAj ⊂ Ai+j , i , j ∈ Z.

ai ∈ Ai deg(ai ) = i

If Ai = 0 for i < 0, then A is positively graded.

Definition

An A-module M is graded if M =⊕

i∈Z Mi , and AiMj ⊂ Mi+j .

N = M〈n〉 denotes the graded module given by Nj = Mn+j , j ∈ Z.

Definition

An A-module homomorphism f between two graded modules M and N isa homomorphism of graded modules if f (Mi ) ⊆ Ni , for all i ∈ Z.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 10 / 27

Graded algebrasX = (X i , d i )i∈Z is a graded complex if X i is a graded module, d i is ahomomorphism of graded A-modules, for all i .

f = {f i}i∈Z ∈ HomA(X ,Y ) is a homomorphism of graded complexesif f i is a homomorphism of graded modules.

X 〈j〉 denotes the complex (X 〈j〉)i := X i 〈j〉 and d iX 〈j〉 := d i .

Theorem

If X and Y are graded A-modules (or complexes), then

HomA(X ,Y ) ∼=⊕i∈Z

HomA−gr (X ,Y 〈i〉).

HomgrA(X ,Y ) :=⊕

i∈Z HomA−gr (X ,Y 〈i〉)The subspace Ht(X ,Y ) of zero homotopic maps is homogeneous.From this we get a grading on HomKb(PA)(X ,Y )

HomgrKb(PA)(X ,Y ) := HomgrA(X ,Y )/Ht(X ,Y )

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 11 / 27

Graded algebrasX = (X i , d i )i∈Z is a graded complex if X i is a graded module, d i is ahomomorphism of graded A-modules, for all i .f = {f i}i∈Z ∈ HomA(X ,Y ) is a homomorphism of graded complexesif f i is a homomorphism of graded modules.

X 〈j〉 denotes the complex (X 〈j〉)i := X i 〈j〉 and d iX 〈j〉 := d i .

Theorem

If X and Y are graded A-modules (or complexes), then

HomA(X ,Y ) ∼=⊕i∈Z

HomA−gr (X ,Y 〈i〉).

HomgrA(X ,Y ) :=⊕

i∈Z HomA−gr (X ,Y 〈i〉)The subspace Ht(X ,Y ) of zero homotopic maps is homogeneous.From this we get a grading on HomKb(PA)(X ,Y )

HomgrKb(PA)(X ,Y ) := HomgrA(X ,Y )/Ht(X ,Y )

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 11 / 27

Graded algebrasX = (X i , d i )i∈Z is a graded complex if X i is a graded module, d i is ahomomorphism of graded A-modules, for all i .f = {f i}i∈Z ∈ HomA(X ,Y ) is a homomorphism of graded complexesif f i is a homomorphism of graded modules.

X 〈j〉 denotes the complex (X 〈j〉)i := X i 〈j〉 and d iX 〈j〉 := d i .

Theorem

If X and Y are graded A-modules (or complexes), then

HomA(X ,Y ) ∼=⊕i∈Z

HomA−gr (X ,Y 〈i〉).

HomgrA(X ,Y ) :=⊕

i∈Z HomA−gr (X ,Y 〈i〉)The subspace Ht(X ,Y ) of zero homotopic maps is homogeneous.From this we get a grading on HomKb(PA)(X ,Y )

HomgrKb(PA)(X ,Y ) := HomgrA(X ,Y )/Ht(X ,Y )

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 11 / 27

Graded algebrasX = (X i , d i )i∈Z is a graded complex if X i is a graded module, d i is ahomomorphism of graded A-modules, for all i .f = {f i}i∈Z ∈ HomA(X ,Y ) is a homomorphism of graded complexesif f i is a homomorphism of graded modules.

X 〈j〉 denotes the complex (X 〈j〉)i := X i 〈j〉 and d iX 〈j〉 := d i .

Theorem

If X and Y are graded A-modules (or complexes), then

HomA(X ,Y ) ∼=⊕i∈Z

HomA−gr (X ,Y 〈i〉).

HomgrA(X ,Y ) :=⊕

i∈Z HomA−gr (X ,Y 〈i〉)The subspace Ht(X ,Y ) of zero homotopic maps is homogeneous.From this we get a grading on HomKb(PA)(X ,Y )

HomgrKb(PA)(X ,Y ) := HomgrA(X ,Y )/Ht(X ,Y )

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 11 / 27

Graded algebrasX = (X i , d i )i∈Z is a graded complex if X i is a graded module, d i is ahomomorphism of graded A-modules, for all i .f = {f i}i∈Z ∈ HomA(X ,Y ) is a homomorphism of graded complexesif f i is a homomorphism of graded modules.

X 〈j〉 denotes the complex (X 〈j〉)i := X i 〈j〉 and d iX 〈j〉 := d i .

Theorem

If X and Y are graded A-modules (or complexes), then

HomA(X ,Y ) ∼=⊕i∈Z

HomA−gr (X ,Y 〈i〉).

HomgrA(X ,Y ) :=⊕

i∈Z HomA−gr (X ,Y 〈i〉)

The subspace Ht(X ,Y ) of zero homotopic maps is homogeneous.From this we get a grading on HomKb(PA)(X ,Y )

HomgrKb(PA)(X ,Y ) := HomgrA(X ,Y )/Ht(X ,Y )

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 11 / 27

Graded algebrasX = (X i , d i )i∈Z is a graded complex if X i is a graded module, d i is ahomomorphism of graded A-modules, for all i .f = {f i}i∈Z ∈ HomA(X ,Y ) is a homomorphism of graded complexesif f i is a homomorphism of graded modules.

X 〈j〉 denotes the complex (X 〈j〉)i := X i 〈j〉 and d iX 〈j〉 := d i .

Theorem

If X and Y are graded A-modules (or complexes), then

HomA(X ,Y ) ∼=⊕i∈Z

HomA−gr (X ,Y 〈i〉).

HomgrA(X ,Y ) :=⊕

i∈Z HomA−gr (X ,Y 〈i〉)The subspace Ht(X ,Y ) of zero homotopic maps is homogeneous.

From this we get a grading on HomKb(PA)(X ,Y )

HomgrKb(PA)(X ,Y ) := HomgrA(X ,Y )/Ht(X ,Y )

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 11 / 27

Graded algebrasX = (X i , d i )i∈Z is a graded complex if X i is a graded module, d i is ahomomorphism of graded A-modules, for all i .f = {f i}i∈Z ∈ HomA(X ,Y ) is a homomorphism of graded complexesif f i is a homomorphism of graded modules.

X 〈j〉 denotes the complex (X 〈j〉)i := X i 〈j〉 and d iX 〈j〉 := d i .

Theorem

If X and Y are graded A-modules (or complexes), then

HomA(X ,Y ) ∼=⊕i∈Z

HomA−gr (X ,Y 〈i〉).

HomgrA(X ,Y ) :=⊕

i∈Z HomA−gr (X ,Y 〈i〉)The subspace Ht(X ,Y ) of zero homotopic maps is homogeneous.From this we get a grading on HomKb(PA)(X ,Y )

HomgrKb(PA)(X ,Y ) := HomgrA(X ,Y )/Ht(X ,Y )

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 11 / 27

The tilting complex

Theorem (Rickard 1989)

Up to derived equivalence, a Brauer tree algebra is determined by thenumber of edges and the multiplicity of the exceptional vertex.

Γ an arbitrary Brauer tree of type (m, e)

S the Brauer star of type (m, e)

Db(AS -mod) ∼= Db(AΓ-mod)

AS is tightly graded, i.e. AS∼=

⊕∞i=0(rad AS)i/(rad AS)i+1.

AΓ is graded.

Question

What is the corresponding grading on AΓ?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 12 / 27

The tilting complex

Theorem (Rickard 1989)

Up to derived equivalence, a Brauer tree algebra is determined by thenumber of edges and the multiplicity of the exceptional vertex.

Γ an arbitrary Brauer tree of type (m, e)

S the Brauer star of type (m, e)

Db(AS -mod) ∼= Db(AΓ-mod)

AS is tightly graded, i.e. AS∼=

⊕∞i=0(rad AS)i/(rad AS)i+1.

AΓ is graded.

Question

What is the corresponding grading on AΓ?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 12 / 27

The tilting complex

Theorem (Rickard 1989)

Up to derived equivalence, a Brauer tree algebra is determined by thenumber of edges and the multiplicity of the exceptional vertex.

Γ an arbitrary Brauer tree of type (m, e)

S the Brauer star of type (m, e)

Db(AS -mod) ∼= Db(AΓ-mod)

AS is tightly graded, i.e. AS∼=

⊕∞i=0(rad AS)i/(rad AS)i+1.

AΓ is graded.

Question

What is the corresponding grading on AΓ?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 12 / 27

The tilting complex

Theorem (Rickard 1989)

Up to derived equivalence, a Brauer tree algebra is determined by thenumber of edges and the multiplicity of the exceptional vertex.

Γ an arbitrary Brauer tree of type (m, e)

S the Brauer star of type (m, e)

Db(AS -mod) ∼= Db(AΓ-mod)

AS is tightly graded, i.e. AS∼=

⊕∞i=0(rad AS)i/(rad AS)i+1.

AΓ is graded.

Question

What is the corresponding grading on AΓ?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 12 / 27

The tilting complex

Theorem (Rickard 1989)

Up to derived equivalence, a Brauer tree algebra is determined by thenumber of edges and the multiplicity of the exceptional vertex.

Γ an arbitrary Brauer tree of type (m, e)

S the Brauer star of type (m, e)

Db(AS -mod) ∼= Db(AΓ-mod)

AS is tightly graded, i.e. AS∼=

⊕∞i=0(rad AS)i/(rad AS)i+1.

AΓ is graded.

Question

What is the corresponding grading on AΓ?

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 12 / 27

The tilting complex

There exist a tilting complex T such that EndKb(PAS)(T )op ∼= AΓ.

T can be constructed by taking Green’s walk around Γ.

There are many such tilting complexes (studied by Rickard, Schaps &Zakay-Illouz).

T is a direct sum of e indecomposable complexes with at most twonon-zero terms.

The summand Ti corresponds to the edge Si of Γ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 13 / 27

The tilting complex

There exist a tilting complex T such that EndKb(PAS)(T )op ∼= AΓ.

T can be constructed by taking Green’s walk around Γ.

There are many such tilting complexes (studied by Rickard, Schaps &Zakay-Illouz).

T is a direct sum of e indecomposable complexes with at most twonon-zero terms.

The summand Ti corresponds to the edge Si of Γ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 13 / 27

The tilting complex

There exist a tilting complex T such that EndKb(PAS)(T )op ∼= AΓ.

T can be constructed by taking Green’s walk around Γ.

There are many such tilting complexes (studied by Rickard, Schaps &Zakay-Illouz).

T is a direct sum of e indecomposable complexes with at most twonon-zero terms.

The summand Ti corresponds to the edge Si of Γ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 13 / 27

Calculating EndK b(PAS)(T )op

If T is a graded complex, then EndgrKb(PAS)(T )op is a graded algebra.

When identifying EndKb(PAS)(T )op with AΓ, HomKb(PAS

)(Ti ,Tj)

corresponds to the space spanned by all paths starting at i and endingat j in the quiver of AΓ.

Theorem (B. 2007)

Let AΓ be a basic Brauer tree algebra corresponding to an arbitrary Brauertree Γ. Then there exists a positive grading on AΓ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 14 / 27

Calculating EndK b(PAS)(T )op

If T is a graded complex, then EndgrKb(PAS)(T )op is a graded algebra.

When identifying EndKb(PAS)(T )op with AΓ, HomKb(PAS

)(Ti ,Tj)

corresponds to the space spanned by all paths starting at i and endingat j in the quiver of AΓ.

Theorem (B. 2007)

Let AΓ be a basic Brauer tree algebra corresponding to an arbitrary Brauertree Γ. Then there exists a positive grading on AΓ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 14 / 27

Calculating EndK b(PAS)(T )op

If T is a graded complex, then EndgrKb(PAS)(T )op is a graded algebra.

When identifying EndKb(PAS)(T )op with AΓ, HomKb(PAS

)(Ti ,Tj)

corresponds to the space spanned by all paths starting at i and endingat j in the quiver of AΓ.

Theorem (B. 2007)

Let AΓ be a basic Brauer tree algebra corresponding to an arbitrary Brauertree Γ. Then there exists a positive grading on AΓ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 14 / 27

Example

◦

@@@@@@@ ◦

◦ •

@@@@@@@

~~~~~~~

◦

~~~~~~~◦

◦

~~~~~~~

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 15 / 27

Example

◦

@@@@@@@ ◦

◦ •S1

@@@@@@@

~~~~~~~

◦

~~~~~~~◦

◦

~~~~~~~

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 15 / 27

Example

◦

@@@@@@@ ◦

◦ •S1

@@@@@@@

S2~~~~~~~

◦

~~~~~~~◦

◦

~~~~~~~

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 15 / 27

Example

◦

@@@@@@@ ◦

◦ S3 •S1

@@@@@@@

S2~~~~~~~

◦

~~~~~~~◦

◦

~~~~~~~

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 15 / 27

Example

◦S4

@@@@@@@ ◦

◦ S3 •S1

@@@@@@@

S2~~~~~~~

◦

~~~~~~~◦

◦

~~~~~~~

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 15 / 27

Example

◦S4

@@@@@@@ ◦

◦ S3 •S1

@@@@@@@

S2~~~~~~~

◦

S5~~~~~~~

◦

◦

~~~~~~~

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 15 / 27

Example

◦S4

@@@@@@@ ◦

◦ S3 •S1

@@@@@@@

S2~~~~~~~

◦

S5~~~~~~~

◦

◦

S6~~~~~~~

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 15 / 27

Example

T is the direct sum of:

T1 : 0 → P1 → 0T2 : 0 → P2 → 0T3 : 0 → P3 → 0T4 : 0 → P3 → P4〈5〉 → 0T5 : 0 → P3 → P5〈4〉 → 0T6 : 0 → P5〈4〉 → P6〈9〉 → 0

The differentials are maps of maximal ranks.

This complex tilts from AS to AΓ: EndKb(PAS)(T ) ∼= Aop

Γ .

HomgrKb(PAS)(Ti ,Tj)

i• α−→j•

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 16 / 27

Example

S4•0

��;;;;;;;;S2•

1

��

S5•

6yy

0

AA��������S3•

6oo

1

AA��������

S6•

0

99

S1•

4

]];;;;;;;;

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 17 / 27

The general case

Edges i and j of a Brauer tree Γ are adjacent to the same vertex.

i and j are at the same distance from the exceptional vertex:

◦

•

Si~~~~~~~

Sj @@@@@@@

◦

◦

• Sl ◦

Si~~~~~~~

Sj @@@@@@@

◦

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 18 / 27

The general case

Edges i and j of a Brauer tree Γ are adjacent to the same vertex.

i and j are at the same distance from the exceptional vertex:

◦

•

Si~~~~~~~

Sj @@@@@@@ �

◦

◦

• Sl ◦

Si~~~~~~~

Sj @@@@@@@ �

◦

If i > j , then deg(α) = i− j. If i < j , then deg(α) = e− (j− i).

deg(β) = 0.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 19 / 27

The general case

The distance of one the edges, say i , is one less than the distance of j :

◦

• Sl ◦ Si ◦

Sj~~~~~~~

Sf

@@

@@

◦

◦

• Sl ◦ Si ◦

Sf~

~~

~

Sj

@@@@@@@

◦

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 20 / 27

The general case

The distance of one the edges, say i , is one less than the distance of j :

◦

• Sl ◦ Si ◦

Sj~~~~~~~

Sf

@@

@@

α 11

◦

◦

• Sl ◦ Si ◦

Sf~

~~

~

Sj

@@@@@@@

β

[[

◦

deg(α) = me;

deg(β) = 0.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 21 / 27

The general case

◦

◦ S11 ◦ S10 ◦ S9 • S1 ◦S2

@@@@@@@

S8~~~~~~~ S6 ◦ S7 ◦

◦S3

@@@@@@@ ◦

◦S4

@@@@@@@

S5~~~~~~~

◦

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 22 / 27

The general case

S8•0

��S11•

0 ** S10•11

jj0

)) S9•11

jj8 )) S1•3

ii

11

99

S6•

0yy

11 )) S7•0

ii

S2•11

��

0

WW

S5•

0

��

S3•0

WW11

99

S4•0

WW

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 23 / 27

The subalgebra A0

S8•0

��S11•

0 ** S10•0

)) S9• S1• S6•

0yy

S7•0

ii

S2•0

WW

S5•

0

��

S3•0

WW

S4•0

WW

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 24 / 27

The subalgebra A0

The quiver of A0 is a union of directed rooted trees.

A0 is a quasi-hereditary algebra.

The global dimension of A0 is bounded by the length (as a rootedtree) of the quiver of A0.

From A0 we can recover AΓ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 25 / 27

The subalgebra A0

The quiver of A0 is a union of directed rooted trees.

A0 is a quasi-hereditary algebra.

The global dimension of A0 is bounded by the length (as a rootedtree) of the quiver of A0.

From A0 we can recover AΓ.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 25 / 27

The group OutK (AΓ)

Gradings are controlled by Out(A).

A =⊕

i∈Z Ai ! π : Gm → Out(A).

A ”good” case is when the maximal tori of Out(A) are isomorphic toGm.

In this case there is essentially unique grading on A.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 26 / 27

The group OutK (AΓ)

Gradings are controlled by Out(A).

A =⊕

i∈Z Ai ! π : Gm → Out(A).

A ”good” case is when the maximal tori of Out(A) are isomorphic toGm.

In this case there is essentially unique grading on A.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 26 / 27

The group OutK (AΓ)

Gradings are controlled by Out(A).

A =⊕

i∈Z Ai ! π : Gm → Out(A).

A ”good” case is when the maximal tori of Out(A) are isomorphic toGm.

In this case there is essentially unique grading on A.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 26 / 27

The group OutK (AΓ)

Gradings are controlled by Out(A).

A =⊕

i∈Z Ai ! π : Gm → Out(A).

A ”good” case is when the maximal tori of Out(A) are isomorphic toGm.

In this case there is essentially unique grading on A.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 26 / 27

The group OutK (AΓ)

Theorem (B. 2008)

Let Γ be an arbitrary Brauer tree of type (m, e). Then

OutK (AΓ) ∼= Aut(k[x ]/(xm+1)).

Corollary (B. 2008)

There is a unique grading on AΓ up to graded Morita equivalence andrescaling.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 27 / 27

The group OutK (AΓ)

Theorem (B. 2008)

Let Γ be an arbitrary Brauer tree of type (m, e). Then

OutK (AΓ) ∼= Aut(k[x ]/(xm+1)).

Corollary (B. 2008)

There is a unique grading on AΓ up to graded Morita equivalence andrescaling.

Dusko Bogdanic (Oxford) Graded Blocks of Group Algebras Leicester, 21 June 2010 27 / 27