Automorphisms of Categories of Free Modules, Free Semimodules, and Free Lie Modules

Abstract

In algebraic geometry over a variety of universal algebras , the group Aut( 0) of automorphisms of the category 0 of finitely generated free algebras of is of great importance. In this paper, semi-inner automorphisms are defined for the categories of free (semi)modules and free Lie modules; then, under natural conditions on a (semi)ring, it is shown that all automorphisms of those categories are semi-inner. We thus prove that for a variety RM of semimodules over an IBN-semiring R (an IBN-semiring is a semiring analog of a ring with IBN), all automorphisms of Aut(RM0) are semi-inner. Therefore, for a wide range of rings, this solves Problem 12 left open in plotkin:slotuag; in particular, for Artinian (Noetherian, PI-) rings R, or a division semiring R, all automorphisms of Aut(RM0) are semi-inner.

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