Multiplicative bases and commutative semiartinian von Neumann regular algebras

Abstract

Let R be a semiartinian (von Neumann) regular ring with primitive factors artinian. The dimension sequence D R is an invariant that captures the various skew-fields and dimensions occurring in the layers of the socle sequence of R. Though D R does not determine R up to an isomorphism even for rings of Loewy length 2, we prove that it does so when R is a commutative semiartinian regular K-algebra of countable type over a field K. The proof is constructive: given the sequence D, we construct the unique K-algebra of countable type R = Bα,n such that D = D R by a transfinite iterative construction from the base case of the K-algebra R(0,K) consisting of all eventually constant sequences in K0. Moreover, we prove that the K-algebras Bα,n possess conormed strong multiplicative bases despite the fact that the ambient K-algebras K do not even have any bounded bases for any infinite cardinal . Recently, a study of the number of limit models in AECs of modules [1] has raised interest in the question of existence of strictly λ-injective modules for arbitrary infinite cardinals λ. In the final section, we construct examples of such modules over the K-algebra R(,K) for each cardinal ≥ λ. [1] M. Mazari-Armida, On limit models and parametrized noetherian rings, J. Algebra 669(2025), 58--74.