Graded Modules of Gelfand–Kirillov Dimension One over Three-Dimensional Artin–Schelter Regular Algebras

The Grothendieck Groups of Module Categories over Coherent Algebras

Sisodia, Gautam

January 2014

Thesis (Ph.D.)--University of Washington, 2014Let <italic>k</italic> be a field and <italic>B</itali...

Local presentability of categories of sheaves of modules

Philip, Bridge

March 2010

We show that the category of modules over a ring in a Grothendieck topos is monadic, and as a conseq...

A REMARK ON GELFAND-KIRILLOV DIMENSION

S. Paul
Smith
James J. Zhang
Communicated Lance W. Small
S. Paul Smith
James J. Zhang

January 2016

Abstract. Let A be a finitely generated non-PI Ore domain and Q the quotient division algebra of A. ...

Graded Modules of Gelfand–Kirillov Dimension One over Three-Dimensional Artin–Schelter Regular Algebras

Van Gastel, Martine
Van den Bergh, Michel

October 1997

AbstractLetAbe a three dimensional Artin–Schelter regular algebra. We give a description of the cate...

Artin–Schelter regular algebras and categories

Martinéz-Villa, Roberto
Solberg, Øyvind

April 2011

AbstractMotivated by constructions in the representation theory of finite dimensional algebras we ge...

Noetherianity and Gelfand–Kirillov dimension of components

Martínez-Villa, Roberto
Solberg, Øyvind

March 2010

AbstractThe category of all additive functors Mod(modΛ) for a finite dimensional algebra Λ were show...

K-theory of Gelfand rings

Carral, M.

June 1980

AbstractThe origin of Gelfand rings comes from [9] where the Jacobson topology and the weak topology...

A note on graded Gelfand-Kirillov dimension of graded algebras

Centrone L.

January 2011

In this paper, we consider associative P.I. algebras over a field F of characteristic 0, graded by a...

On Multigraded Generalizations of Kirillov-Reshetikhin Modules

Bianchi, A
Chari, V
Fourier, G
Moura, A

November 2015

Fundação de Amparo à Pesquisa do Estado de São Paulo (FAPESP)Conselho Nacional de Desenvolvimento Ci...

Stable equivalences of graded algebras

Dugas, Alex S.
Martínez-Villa, Roberto

December 2008

AbstractWe extend the notion of stable equivalence to the class of locally finite graded algebras. F...

The Popescu–Gabriel theorem for triangulated categories

Porta, Marco

October 2010

AbstractThe Popescu–Gabriel theorem states that each Grothendieck abelian category is a localization...

Non-regular algebras of dimension 3

Stout, Amy Marguerite Irwin

January 2012

Finding suitable methods for associating geometry to noncommutative graded algebras has been a goal ...

Noetherianity and Ext

Green, E.L.
Snashall, N.
Solberg, Ø.
Zacharia, D.

July 2008

AbstractLet R=R0⊕R1⊕R2⊕⋯ be a graded algebra over a field K such that R0 is a finite product of copi...

Cycle-finite module categories

Malicki, Piotr
Skowroński, Andrzej
Pena, Jose Antonio

January 2013

We describe the structure of module categories of finite dimensional al- gebras over an algebraical...

A NEW PROOF OF CARTIER'S THIRD THEOREM

Hazewinkel, M.

April 2018

Let Gf A be the category of finite dimensional commutative formal == groups over a ring A. To A one ...

The Grothendieck Groups of Module Categories over Coherent Algebras

Sisodia, Gautam

January 2014

Thesis (Ph.D.)--University of Washington, 2014Let <italic>k</italic> be a field and <italic>B</itali...

Local presentability of categories of sheaves of modules

Philip, Bridge

March 2010

We show that the category of modules over a ring in a Grothendieck topos is monadic, and as a conseq...

A REMARK ON GELFAND-KIRILLOV DIMENSION

S. Paul
Smith
James J. Zhang
Communicated Lance W. Small
S. Paul Smith
James J. Zhang

January 2016

Abstract. Let A be a finitely generated non-PI Ore domain and Q the quotient division algebra of A. ...

Graded Modules of Gelfand–Kirillov Dimension One over Three-Dimensional Artin–Schelter Regular Algebras

Van Gastel, Martine
Van den Bergh, Michel

October 1997

AbstractLetAbe a three dimensional Artin–Schelter regular algebra. We give a description of the cate...

Artin–Schelter regular algebras and categories

Martinéz-Villa, Roberto
Solberg, Øyvind

April 2011

AbstractMotivated by constructions in the representation theory of finite dimensional algebras we ge...

Noetherianity and Gelfand–Kirillov dimension of components

Martínez-Villa, Roberto
Solberg, Øyvind

March 2010

AbstractThe category of all additive functors Mod(modΛ) for a finite dimensional algebra Λ were show...

K-theory of Gelfand rings

Carral, M.

June 1980

AbstractThe origin of Gelfand rings comes from [9] where the Jacobson topology and the weak topology...

A note on graded Gelfand-Kirillov dimension of graded algebras

Centrone L.

January 2011

In this paper, we consider associative P.I. algebras over a field F of characteristic 0, graded by a...

On Multigraded Generalizations of Kirillov-Reshetikhin Modules

Bianchi, A
Chari, V
Fourier, G
Moura, A

November 2015

Fundação de Amparo à Pesquisa do Estado de São Paulo (FAPESP)Conselho Nacional de Desenvolvimento Ci...

Stable equivalences of graded algebras

Dugas, Alex S.
Martínez-Villa, Roberto

December 2008

AbstractWe extend the notion of stable equivalence to the class of locally finite graded algebras. F...

The Popescu–Gabriel theorem for triangulated categories

Porta, Marco

October 2010

AbstractThe Popescu–Gabriel theorem states that each Grothendieck abelian category is a localization...

Non-regular algebras of dimension 3

Stout, Amy Marguerite Irwin

January 2012

Finding suitable methods for associating geometry to noncommutative graded algebras has been a goal ...

Noetherianity and Ext

Green, E.L.
Snashall, N.
Solberg, Ø.
Zacharia, D.

July 2008

AbstractLet R=R0⊕R1⊕R2⊕⋯ be a graded algebra over a field K such that R0 is a finite product of copi...

Cycle-finite module categories

Malicki, Piotr
Skowroński, Andrzej
Pena, Jose Antonio

January 2013

We describe the structure of module categories of finite dimensional al- gebras over an algebraical...

A NEW PROOF OF CARTIER'S THIRD THEOREM

Hazewinkel, M.

April 2018

Let Gf A be the category of finite dimensional commutative formal == groups over a ring A. To A one ...

The Grothendieck Groups of Module Categories over Coherent Algebras

Sisodia, Gautam

January 2014

Thesis (Ph.D.)--University of Washington, 2014Let <italic>k</italic> be a field and <italic>B</itali...

Local presentability of categories of sheaves of modules

Philip, Bridge

March 2010

We show that the category of modules over a ring in a Grothendieck topos is monadic, and as a conseq...

A REMARK ON GELFAND-KIRILLOV DIMENSION

S. Paul
Smith
James J. Zhang
Communicated Lance W. Small
S. Paul Smith
James J. Zhang

January 2016

Abstract. Let A be a finitely generated non-PI Ore domain and Q the quotient division algebra of A. ...

Graded Modules of Gelfand–Kirillov Dimension One over Three-Dimensional Artin–Schelter Regular Algebras

Abstract

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Graded Modules of Gelfand–Kirillov Dimension One over Three-Dimensional Artin–Schelter Regular Algebras

Abstract

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