Saeed Salehi
Published 2016-12-20Version 1
Axiomatizing mathematical structures is a goal of Mathematical Logic. Axiomatizability of the theories of some structures have turned out to be quite difficult and challenging, and some remain open. However axiomatization of some mathematical structures are now classical theorems in Logic, Algebra and Geometry. In this paper we will study the axiomatizability of the theories of multiplication in the domains of natural, integer, rational, real, and complex numbers. We will review some classical theorems, and will give some new proofs for old results. We will see that some structures are missing in the literature, thus leaving it open whether the theories of that structures are axiomatizable (decidable) or not. We will answer one of those open questions in this paper.
Comments: A Conference Paper at Sharif University of Technology, 25-27 December 2012, Tehran
Journal: A. Kamali-Nejad (ed.), Proceedings of Frontiers in Mathematical Sciences, Fundamental Education Publications, Iran (2012) pp. 165-176
Computation in Logic and Logic in Computation
On the Decidability of the Ordered Structures of Numbers
Logic Blog 2014
![QR code for arXiv:1612.06525 [math.LO]](http://oss.arxitics.com/images/favicon.svg)