Characterizing categoricity in the class Add(M)
Abstract
We show that the condition of being categorical in a tail of cardinals can be characterized for the class of R-modules of the form (M). More precisely, let R be a ring and M be an R-module which can be generated by ≤ elements. Then (M) is -categorical in all > R++0 if and only if (M) is -categorical in some > R++0; if and only if every R-module of cardinal in (M) is M-free for all > R++0; if and only if every R-module of cardinal ( R++0)+ in (M) is M-free. As an application, we show that the class of pure-projective R-modules is categorical in some (all) big cardinal if and only if the module P(0) is free for each countably generated pure-projective R-module P; the class of semisimple R-modules is categorical in some (all) big cardinal if and only if R admits a unique simple module up to isomorphism, partly answering a question proposed in [5, Mazari-Armida M., Characterizing categoricity in several classes of modules. J. Algebra 617, 382-401 (2023)].
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.