Ring $R_{ 171 }$

Bergman's ring without IBN

Description:

(to be added) The ring $R$ has the property that there exists a f.g. projective $R$ module $M$ and a module $N$ such that in the monoid of isomorphism classes of $R$ modules, $[M]+[N]=[R]=[R]+[R]$.

Reference(s):

  • G. M. Bergman. Coproducts and some universal ring constructions. (1974) @ (Fixme)
  • T.-Y. Lam. Exercises in modules and rings. (2007) @ Exercise 18.11, pp 362-363


Legend
  • = has the property
  • = does not have the property
  • = information not in database

(Nothing was retrieved.)

(Nothing was retrieved.)