Let be the restriction of usual order relation to integers which are primes or squares of primes, and let ⊥ denote the coprimeness predicate. The elementary theory of is undecidable. Now denote by <π the restriction of order to primary numbers. All arithmetical relations restricted to primary numbers are definable in the structure (ℕ; ⊥, <π). Furthermore, the structures (ℕ; ∣, <π) (ℕ; =, ×, <π) and (ℕ; =, +, ×) are interdefinable.