Add to ORKGThe principal focus of this thesis is the study of the real numbers regarded as a structure endowed with its usual addition and multiplication and the operations of raising to real powers. For our first main result we prove that any statement in the language of this structure is equivalent to an existential statement, and furthermore that this existential statement can be chosen independently of the concrete interpretations of the real power functions in the statement; i.e. one existential statement will work for any choice of real power functions. This result we call uniform model completeness. For the second main result we introduce the first order theory of raising to an infinite power, which can be seen as the theory of a class of real...
We show that the theory of the real field with a generic real power function is decidable, relative ...
The notion of an o-minimal expansion of the ordered field of real numbers was invented by L van den ...
Using a modification of Wilkie's recent proof of o-minimality for Pfaffian functions, we gave a...
The principal focus of this thesis is the study of the real numbers regarded as a structure endowed ...
The principal focus of this thesis is the study of the real numbers regarded as a structure endowed ...
AbstractWe investigate expansions of the ordered field of real numbers equipped with a family of rea...
AbstractWe investigate expansions of the ordered field of real numbers equipped with a family of rea...
Model theoretic algebra has witnessed remarkable progress in the last few years. It has found profou...
Motivated by the decidability question for the theory of real exponentiation and by the Transfer Con...
Motivated by the decidability question for the theory of real exponentiation and by the Transfer Con...
O-minimal expansions of ordered fields are investigated, with particular emphasis on polynomially bo...
O-minimal expansions of ordered fields are investigated, with particular emphasis on polynomially bo...
The notion of an o-minimal expansion of the ordered field of real numbers was invented by L van den ...
We survey recent results on o-rninimal theories, and in particular o-minimal expansions of real clos...
We describe the valuation theoretic properties of the Hardy fields associated to models of , where T...
We show that the theory of the real field with a generic real power function is decidable, relative ...
The notion of an o-minimal expansion of the ordered field of real numbers was invented by L van den ...
Using a modification of Wilkie's recent proof of o-minimality for Pfaffian functions, we gave a...
The principal focus of this thesis is the study of the real numbers regarded as a structure endowed ...
The principal focus of this thesis is the study of the real numbers regarded as a structure endowed ...
AbstractWe investigate expansions of the ordered field of real numbers equipped with a family of rea...
AbstractWe investigate expansions of the ordered field of real numbers equipped with a family of rea...
Model theoretic algebra has witnessed remarkable progress in the last few years. It has found profou...
Motivated by the decidability question for the theory of real exponentiation and by the Transfer Con...
Motivated by the decidability question for the theory of real exponentiation and by the Transfer Con...
O-minimal expansions of ordered fields are investigated, with particular emphasis on polynomially bo...
O-minimal expansions of ordered fields are investigated, with particular emphasis on polynomially bo...
The notion of an o-minimal expansion of the ordered field of real numbers was invented by L van den ...
We survey recent results on o-rninimal theories, and in particular o-minimal expansions of real clos...
We describe the valuation theoretic properties of the Hardy fields associated to models of , where T...
We show that the theory of the real field with a generic real power function is decidable, relative ...
The notion of an o-minimal expansion of the ordered field of real numbers was invented by L van den ...
Using a modification of Wilkie's recent proof of o-minimality for Pfaffian functions, we gave a...