Mal'tsev local theorems

Theorems on transferring properties of local parts of a model (in logic) to the whole model, established by A.I. Mal'tsev. A system of subsets of a set is called a local covering of it if each element of the set is contained in some and any two , are contained in a third subset . Examples of local coverings are: the system of all finite subsets of a set, and the system of all finitely-generated subgroups of a given group. A model locally has a property if there is a local covering of consisting of submodels with the property . A local theorem holds for a property (and a corresponding class of models) if every model locally having property has the property in the large.

A source of a great variety of local theorems is the following fundamental local theorem of Mal'tsev (or the compactness theorem of the restricted predicate calculus) [1]: If each finite subsystem of an infinite system of axioms of the restricted predicate calculus is consistent, then the whole system is consistent. Mal'tsev [2] gave a general method for obtaining concrete local theorems in group theory with the help of the fundamental local theorem, thus making a major contribution to model theory. Later, by improving the method itself, he proved [3] a local theorem for any property described by so-called quasi-universal axioms. The question of the validity of a local theorem for a property , which had previously been investigated separately for each , has thus been reduced to a common and quite "grammatical" question: Is it possible to describe by universal axioms?

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Comments

English translations of references [1], [2] and [3] may be found as Chapts. 1, 2 and 11 in [a1].

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