The representation theory of maximal Cohen-Macaulay modules began in the late 1970s and grew quickly, because of the important role they play in Commutative Algebra and also Representation Theory of Algebras. Study of Cohen-Macaulay local rings, respectively Artin algebras, having only a finite number of iso-classes of indecomposable maximal Cohen-Macaulay modules, that is, having finite CM type, is an active area of research.There are two important texts in the literature on the subject:
- Cohen-Macaulay Representations, By Graham J. Leuschke, Roger Wiegand, American Mathematical Society, 2012.
- Cohen-Macaulay modules over Cohen-Macaulay rings, By Yuji Yoshino, London Mathematical Society, Lecture Notes Series vol. 146, Cambridge University Press, 1990.
Our aim in this workshop is to review the theory based on the above two books and hence explore the interactions of commutative algebra and representation theory.
It is worth to mention that also Sara Faridi from Dalhousie University will be our guest during the time of the workshop and she will present some lectures on her recent research.
Sara Faridi, Dalhousie University, Halifax, Canada
Title: Subadditivity of Maximal Degrees of Betti Numbers (abstract)
Schedule: 3 July 2019, 9:30 - 10:30 and 11:00 - 12:00
29 June to 2 July 2019 (8 - 13 Tir, 1398)
Mohammad Taghi Dibaei, Kharazmi University, and IPM, Tehran, Iran
Kamran Divaani - Aazar, Alzahra University, and IPM, Tehran, Iran
Saeed Nasseh, Georgia Southern University, Statesboro, USA Arash Sadeghi, IPM, Tehran, Iran
Registration Deadline: June 21, 2019 (31 Khordad, 1398)
Deadline for Application for Accommodations : June 15, 2019 (25 Khordad, 1398)
Venu: IPM Niavaran Building, Niavaran Square, Tehran, Iran