Add to ORKGIn recent years the field of real numbers expanded by a multiplicative subgroup has been studied extensively. In this thesis, the known results will be extended to expansions of the real field. I will consider the structure R consisting of the field of real numbers and an irrational power function. Using Schanuel conditions, I will give a first-order axiomatization of expansions of R by a dense multiplicative subgroup which is a subset of the real algebraic numbers. It will be shown that every definable set in such a structure is a boolean combination of existentially definable sets and that these structures have o-minimal open core. A proof will be given that the Schanuel conditions used in proving these statements hold for co-countably ma...
Thesis (MSc)--Stellenbosch University, 2021.ENGLISH ABSTRACT: We investigate the behaviour of algebr...
We consider the classical universal covering exp: C − → C ∗ of the complex torus as an algebraic str...
Yu. I. Manin conjectured that the maximal abelian extensions of the real quadratic number fields are...
In recent years the field of real numbers expanded by a multiplicative subgroup has been studied ext...
In this thesis, we study expansions of the real field by multiplicative subgroups of the complex num...
The principal focus of this thesis is the study of the real numbers regarded as a structure endowed ...
114 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2008.The general theme of this the...
Exploring further the connection between exponentiation on real closed fields and the existence of a...
AbstractWe present some recent results and problems concerning definable sets and functions in o-min...
Abstract. Exploring further the connection between exponentia-tion on real closed fields and the exi...
Let R be the field of real numbers. A complete axiomatization of the theory of (R, 2Z), the real fie...
We describe definable sets in the field of reals augmented by a predicate for a finite rank multipli...
AbstractWe investigate expansions of the ordered field of real numbers equipped with a family of rea...
AbstractWe study subgroups G of GL(n,R) definable in o-minimal expansions M=(R,+,·,…) of a real clos...
We survey recent results on o-rninimal theories, and in particular o-minimal expansions of real clos...
Thesis (MSc)--Stellenbosch University, 2021.ENGLISH ABSTRACT: We investigate the behaviour of algebr...
We consider the classical universal covering exp: C − → C ∗ of the complex torus as an algebraic str...
Yu. I. Manin conjectured that the maximal abelian extensions of the real quadratic number fields are...
In recent years the field of real numbers expanded by a multiplicative subgroup has been studied ext...
In this thesis, we study expansions of the real field by multiplicative subgroups of the complex num...
The principal focus of this thesis is the study of the real numbers regarded as a structure endowed ...
114 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2008.The general theme of this the...
Exploring further the connection between exponentiation on real closed fields and the existence of a...
AbstractWe present some recent results and problems concerning definable sets and functions in o-min...
Abstract. Exploring further the connection between exponentia-tion on real closed fields and the exi...
Let R be the field of real numbers. A complete axiomatization of the theory of (R, 2Z), the real fie...
We describe definable sets in the field of reals augmented by a predicate for a finite rank multipli...
AbstractWe investigate expansions of the ordered field of real numbers equipped with a family of rea...
AbstractWe study subgroups G of GL(n,R) definable in o-minimal expansions M=(R,+,·,…) of a real clos...
We survey recent results on o-rninimal theories, and in particular o-minimal expansions of real clos...
Thesis (MSc)--Stellenbosch University, 2021.ENGLISH ABSTRACT: We investigate the behaviour of algebr...
We consider the classical universal covering exp: C − → C ∗ of the complex torus as an algebraic str...
Yu. I. Manin conjectured that the maximal abelian extensions of the real quadratic number fields are...