Model-theoretic K1 for modules over semisimple rings: (weak) Morita invariance

Abstract

This paper is a sequel to a paper by the same authors, where they defined K-groups of model-theoretic structures, and computed K1 of free modules over PIDs. In this paper, we compute K1 of a right Mq(R)-module M, where R is a division ring, q≥1, and |Mq(R)|≠ 2. As a consequence, we obtain a (weak) Morita invariance K1(RR) K1((Mq(R))Mq(R)) for all division rings R and q≥ 1. Finally, we compute K1 of a module over a semisimple ring by showing that the model-theoretic K1 commutes with finite product of modules. We also show that the algebraic K1 of a finite product of infinite matrix rings embeds into the model-theoretic K1 of their right regular modules.

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