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On ordering and multiplication of natural numbers
Archive for Mathematical Logic 40 (1):19-23 (2001)
Abstract
Even if the ordering of all natural number is (known to be) not definable from multiplication of natural numbers and ordering of primes, there is a simple axiom system in the language $(\times,<,1)$ such that the multiplicative structure of positive integers has a unique expansion by a linear order coinciding with the standard order for primes and satisfying the axioms – namely the standard oneMy notes
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References found in this work
Definability and decision problems in arithmetic.Julia Robinson - 1949 - Journal of Symbolic Logic 14 (2):98-114.
Undecidable Extensions of Skolem Arithmetic.Alexis Bes & Denis Richard - 1998 - Journal of Symbolic Logic 63 (2):379-401.
The Theory of Integer Multiplication with Order Restricted to Primes is Decidable.Francoise Maurin - 1997 - Journal of Symbolic Logic 62 (1):123-130.
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