We give a new set theoretic system of axioms motivated by a topological intuition: The set of subsets of any set is a topology on that set. On the one hand, this system is a common weakening of Zermelo-Fraenkel set theory ZF, the positive set theory GPK and the theory of hyperuniverses. On the other hand, it retains most of the expressiveness of these theories and has the same consistency strength as ZF. We single out the additional axiom of the universal set as the one that increases the consistency strength to that of GPK and explore several other axioms and interrelations between those theories. Hyperuniverses are a natural class of models for theories with a universal set. The Aleph_0- and Aleph_1-dimensional Cantor cubes are examples ...
神奈川県茅ヶ崎市 Nonstandard analysis is introduced by Robinson that apply model theory to it. But nonstanda...
Gödel’s universe L of constructible sets has many attractive features. It has a definable wellorder...
Cantor believed that properties holding for finite sets might also hold for infinite sets. One such ...
We give a new set theoretic system of axioms motivated by a topological intuition: The set of subset...
AbstractStructures exhibiting strong comprehension properties have been utilized in different fields...
The Hyperuniverse Programme, introduced in Arrigoni and Friedman (2013), fosters the searc...
It is standard in set theory to assume that Cantor's Theorem establishes that the continuum is an un...
The object of this thesis is to study topological properties of. correspondences, or set-valued mapp...
AbstractWe develop an axiomatic set theory — the Theory of Hyperfinite Sets THS— which is based on t...
This is a survey of some possible extensions of ZF to a larger universe, closer to the “naive set th...
Cantor thought of the principles of set theory or intuitive principles as universal forms that can a...
A MULTIVERSE AXIOM INDUCTION FRAMEWORK The multiverse paradigm in set theory does not only reflect p...
We modify the definable ultrapower construction of Kanovei and Shelah (2004) to develop a ZF-definab...
Discussion of new axioms for set theory has often focussed on conceptions of maximality, and how the...
AbstractThe first paper published on Abstract Stone Duality showed that the overt discrete objects (...
神奈川県茅ヶ崎市 Nonstandard analysis is introduced by Robinson that apply model theory to it. But nonstanda...
Gödel’s universe L of constructible sets has many attractive features. It has a definable wellorder...
Cantor believed that properties holding for finite sets might also hold for infinite sets. One such ...
We give a new set theoretic system of axioms motivated by a topological intuition: The set of subset...
AbstractStructures exhibiting strong comprehension properties have been utilized in different fields...
The Hyperuniverse Programme, introduced in Arrigoni and Friedman (2013), fosters the searc...
It is standard in set theory to assume that Cantor's Theorem establishes that the continuum is an un...
The object of this thesis is to study topological properties of. correspondences, or set-valued mapp...
AbstractWe develop an axiomatic set theory — the Theory of Hyperfinite Sets THS— which is based on t...
This is a survey of some possible extensions of ZF to a larger universe, closer to the “naive set th...
Cantor thought of the principles of set theory or intuitive principles as universal forms that can a...
A MULTIVERSE AXIOM INDUCTION FRAMEWORK The multiverse paradigm in set theory does not only reflect p...
We modify the definable ultrapower construction of Kanovei and Shelah (2004) to develop a ZF-definab...
Discussion of new axioms for set theory has often focussed on conceptions of maximality, and how the...
AbstractThe first paper published on Abstract Stone Duality showed that the overt discrete objects (...
神奈川県茅ヶ崎市 Nonstandard analysis is introduced by Robinson that apply model theory to it. But nonstanda...
Gödel’s universe L of constructible sets has many attractive features. It has a definable wellorder...
Cantor believed that properties holding for finite sets might also hold for infinite sets. One such ...