International Journal of Mathematics and Mathematical Sciences
Volume 5 (1982), Issue 1, Pages 61-85
Algebras with actions and automata
1Fachbereich Mathematik, TU Berlin, Str. d. 17. Juni 135, 1000, Berlin 12, Germany
2Mathematics Department, University of California, Berkeley 94720, California, USA
Received 18 February 1980
Copyright © 1982 W. Kühnel et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
In the present paper we want to give a common structure theory of left action, group operations, -modules and automata of different types defined over various kinds of carrier objects: sets, graphs, presheaves, sheaves, topological spaces (in particular: compactly generated Hausdorff spaces). The first section gives an axiomatic approach to algebraic structures relative to a base category , slightly more powerful than that of monadic (tripleable) functors. In section we generalize Lawveres functorial semantics to many-sorted algebras over cartesian closed categories. In section we treat the structures mentioned in the beginning as many-sorted algebras with fixed scalar or input object and show that they still have an algebraic (or monadic) forgetful functor (theorem 3.3) and hence the general theory of algebraic structures applies. These structures were usually treated as one-sorted in the Lawvere-setting, the action being expressed by a family of unary operations indexed over the scalars. But this approach cannot, as the one developed here, describe continuity of the action (more general: the action to be a -morphism), which is essential for the structures mentioned above, e.g. modules for a sheaf of rings or topological automata. Finally we discuss consequences of theorem 3.3 for the structure theory of various types of automata. The particular case of algebras with fixed natural numbers object has been studied by the authors in .