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Algebra And Geometry Research Group

1. Introduction

Algebra and Geometry Research Group (AGR) is a research group founded by Ton Duc Thang University. The Study of the structures of modules over commutative rings is a main work in commutative algebra. Especially, local cohomology introduced by Grothendieck is an important tool. On this basis, we can study algebraic varieties as major objects in algebraic geometry.

2. Mission and vision

The purpose of AGR is to study the structures of modules over commutative rings, local homology and local cohomology. We are also interested in studying on algebraic varieties as major objects in algebraic geometry.

3. Research topics

• Commutative rings and modules

• Linearly compact modules

• Local homology and local cohomology

• Duality

• Multiplicity theory

• Algebraic varieties

4. Current members

AGR_Tran_Tuan_Nam.jpg

Dr. Tran Tuan Nam

Positions:

• Head of Algebra and Geometry Research Group, Ton Duc Thang University, Ho Chi Minh City, Vietnam

• Associate Professor in Mathematics-Informatics

Areas of expertise: Commutative rings and modules, Linearly compact modules, Local homology, Local cohomology, Duality, Multiplicity theory and Algebraic varieties

Research track record (until October of 2017):

• ISI papers: 21

• Top ISI journals (at most 5):

1. Mathematical Proceedings of the Cambridge Philosophical Society

2. Journal of Algebra

3. International Journal of Mathematics

4. Journal of Mathematics of Kyoto University

5. International Journal of Algebra and Computation

AGR_Nguyen_Minh_Tri.jpg

Dr. Nguyen Minh Tri

Position: Member of Algebra and Geometry Research Group, Ton Duc Thang University, Ho Chi Minh City, Vietnam

Areas of expertise: Commutative rings and modules, Local cohomology, Duality and Algebraic varieties

AGR_Do_Ngoc_Yen.jpg

Do Ngoc Yen, MSc

Position: Member of Algebra and Geometry Research Group, Ton Duc Thang University, Ho Chi Minh City, Vietnam

Areas of expertise: Commutative rings and modules, Linearly compact modules, Local homology, Local cohomology, Duality and Multiplicity theory

5. Former members (name, title, picture)

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6. Publications (ISI or Scopus only)

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7. Contact: Click here