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MSP — About — Board Paul Balmer works in algebra, more specifically around homological and homotopical algebra, category theory, K -theory, representation theory, algebraic geometry and related topics
Paul Balmers articles on arXiv The Tate Intermediate Value Theorem Paul Balmer, Beren Sanders Comments: 35 pages Subjects: Commutative Algebra (math AC); Category Theory (math CT); K-Theory and Homology (math KT); Representation Theory (math RT) [3] arXiv:2411 14761 [pdf, other]
MATH 212B | Bruinwalk Requisites: courses 210A, 210B, 210C, 212A Advanced topics in modern homological algebra, such as triangulated categories, differential graded algebras as dg-categories, tilting theory and applications of group cohomology to representation theory, stable categories and modular representation theory, and other current topics S U or letter grading
Paul Balmer | University of California-Los Angeles Dr Paul Balmer is instrumental in shaping the academic landscape at the UCLA Department of Mathematics With a Ph D from the University of Lausanne, Switzerland, obtained in 1998, he brings a wealth of knowledge and expertise to his role
Paul Balmer - The Mathematics Genealogy Project Click here to see the students listed in chronological order According to our current on-line database, Paul Balmer has 11 students and 15 descendants We welcome any additional information If you have additional information or corrections regarding this mathematician, please use the update form
Paul Balmer in nLab - ncatlab. org Paul Balmer is a mathematician working in algebraic geometry, algebraic K-theory, homotopy theory and category theory
Paul Balmer - MATH 210B | Bruinwalk Professor Balmer's 210B is tough, but I think it can be worth it if you are into abstract algebra It covers everything from the middle of 110B to the end of 110C It also covers Morita theory, projective and injective modules, tensor-hom adjunction, etc