Add to ORKGAimed at graduate students and research logicians and mathematicians, this much-awaited text covers over forty years of work on relative classification theory for non-standard models of arithmetic. With graded exercises at the end of each chapter, the book covers basic isomorphism invariants: families of types realized in a model, lattices of elementary substructures and automorphism groups. Many results involve applications of the powerful technique of minimal types due to HaimGaifman, and some of the results are classical but have never been published in a book form before
Presenting recent developments and applications, the book focuses on four main topics in current mod...
We investigate differences in isomorphism types for Rogers semilattices of computable numberings of ...
AbstractWe develop the method of iterated ultrapower representation to provide a unified and perspic...
AbstractWe completely characterize those distributive lattices which can be obtained as elementary s...
AbstractLet T be some complete extension of Peano's axioms of arithmetic. If M<N are models of T, th...
After introducing basic notation and results in chapter one, we begin studying the model theory of t...
We investigate differences in isomorphism types and elementary theories of Rogers semilattices of a...
In this paper some of the basics of classification theory for abstract elementary classes are discus...
Abstract. Exploring further the connection between exponentia-tion on real closed fields and the exi...
of doctoral thesis Study of Arithmetical Structures and Theories with Regard to Representative and D...
Exploring further the connection between exponentiation on real closed fields and the existence of a...
In the present thesis we study the domain of Peano products (in a given model of the Presburger arit...
AbstractWe study the minimal enumeration degree (e-degree) problem in models of fragments of Peano a...
When studying the automorphism group Aut(M) of a model M, one is interested to what extent M is rec...
Abstract. We study the history and recent developments in non-elementary classes. We discuss the rol...
Presenting recent developments and applications, the book focuses on four main topics in current mod...
We investigate differences in isomorphism types for Rogers semilattices of computable numberings of ...
AbstractWe develop the method of iterated ultrapower representation to provide a unified and perspic...
AbstractWe completely characterize those distributive lattices which can be obtained as elementary s...
AbstractLet T be some complete extension of Peano's axioms of arithmetic. If M<N are models of T, th...
After introducing basic notation and results in chapter one, we begin studying the model theory of t...
We investigate differences in isomorphism types and elementary theories of Rogers semilattices of a...
In this paper some of the basics of classification theory for abstract elementary classes are discus...
Abstract. Exploring further the connection between exponentia-tion on real closed fields and the exi...
of doctoral thesis Study of Arithmetical Structures and Theories with Regard to Representative and D...
Exploring further the connection between exponentiation on real closed fields and the existence of a...
In the present thesis we study the domain of Peano products (in a given model of the Presburger arit...
AbstractWe study the minimal enumeration degree (e-degree) problem in models of fragments of Peano a...
When studying the automorphism group Aut(M) of a model M, one is interested to what extent M is rec...
Abstract. We study the history and recent developments in non-elementary classes. We discuss the rol...
Presenting recent developments and applications, the book focuses on four main topics in current mod...
We investigate differences in isomorphism types for Rogers semilattices of computable numberings of ...
AbstractWe develop the method of iterated ultrapower representation to provide a unified and perspic...