Lists of Ring Theorists URL: http://www.uwm.edu/~adbell/RT/lists.html Preliminary alpha version, 1 October 1999 Last changed (minor) 27 June 2001 This page contains pointers to various lists of mathematicians who study non-commutative, associative rings. The lists contain links to Web pages, e-mail addresses, MathSciNet entries, when available. These lists are far from complete and far from ...
ABOUT: POINTERS: 16: Associative rings and algebras Introduction Here are a few notes on (noncommutative) associative ring theory. ( Commutative rings are treated separately, as are non-associative rings). There is a long FAQ on sets with products (rings), a particular emphasis of which is the study of division rings over the reals. Associative division algebras are of particular importance.
www.math.niu.edu/~rusin/known-math/index/16-XX.html
ABOUT: POINTERS: 17: Nonassociative rings and algebras Introduction Here are a few notes on nonassociative rings; associative rings are treated in a separate section. There is a long FAQ on sets with products (rings), a particular emphasis of which is the study of division rings over the reals, including the nonassociative ones. For detailed expository information you are welcome to to peruse an ...
www.math.niu.edu/~rusin/known-math/index/17-XX.html
Basic Books on Rings and Modules General Theory of Rings and Modules Lambeck, Rings and Modules This is a very nice, small, readable book. Most of all, it is interesting. It probably represents the strongest influence on the graduate algebra course I teach. P. M. Cohn, Algebra 3 volumes, covering undergraduate algebra, standard graduate topics, and advanced topics. Horrendously expensive. I. M.
www.math.hawaii.edu/~lee/algebra/references.html
Tim Hodges Some group photographs from Noncommutative Ring Theory meetings The noncommutative ring theory conference at MSRI. The Goldie retirement conference in Leeds A noncommutative ring theory conference in Durham The Azumaya retirement conference in Bloomington. ...
math.uc.edu/~hodgestj/pics.htm