Isotropy and Combination Problems

Abstract

In a previous paper, the author and his collaborators studied the phenomenon of isotropy in the context of single-sorted equational theories, and showed that the isotropy group of the category of models of any such theory encodes a notion of inner automorphism for the theory. Using results from the treatment of combination problems in term rewriting theory, we show in this article that if T1 and T2 are (disjoint) equational theories satisfying minimal assumptions, then any free, finitely generated model of the disjoint union theory T1 + T2 has trivial isotropy group, and hence the only inner automorphisms of such models, i.e. the only automorphisms of such models that are coherently extendible, are the identity automorphisms. As a corollary, we show that the global isotropy group of the category of models (T1 + T2)mod, i.e. the group of invertible elements of the centre of this category, is the trivial group.