Theories of real addition with and without a predicate for integers

Abstract

We show that it is decidable whether or not a relation on the reals definable in the structure R, +,<, Z can be defined in the structure R, +,<, 1 . This result is achieved by obtaining a topological characterization of R, +,<, 1 -definable relations in the family of R, +,<, Z -definable relations and then by following Muchnik's approach of showing that the characterization of the relation X can be expressed in the logic of R, +,<,1, X . The above characterization allows us to prove that there is no intermediate structure between R, +,<, Z and R, +,<, 1 . We also show that a R, +,<, Z -definable relation is R, +,<, 1 -definable if and only if its intersection with every R, +,<, 1 -definable line is R, +,<, 1 -definable. This gives a noneffective but simple characterization of R, +,<, 1 -definable relations.