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Limit cardinal
Singular Cardinals: from Hausdorff's Gaps to Shelah's Pcf Theory
Ineffability Within the Limits of Abstraction Alone
Notes on Set Theory, Part 2
Souslin Trees and Successors of Singular Cardinals
Set Theory in Computer Science a Gentle Introduction to Mathematical Modeling I
What Is Mathematics: Gödel's Theorem and Around. by Karlis
[Math.LO] 26 Nov 2002
Cardinal Arithmetic: the Silver and Galvin-Hajnal Theorems
Set-Theoretical Background 1.1 Ordinals and Cardinals
3. Cardinal Numbers
SCALES at ℵω in This Paper We Analyze the PCF Structure of a Generic Extension by the Main Forcing from Our Previous Paper [1
Chapter 2 Constructible Sets
Constructing Cardinals from Below
Set Theory and Model Theory Rahim Moosa, University of Waterloo
Symmetric Models, Singular Cardinal Patterns, and Indiscernibles
§10. Cardinals
MATH 320 SET THEORY Contents 0. Prelude 0.1. Some Historical
INTRODUCTION to LARGE CARDINALS the Aim of This Talk Is
Top View
§1. Philosophical Background: Iteration, Ineffability, Reflection
The Relative Consistency of the Axiom of Choice and the Generalized Continuum Hypothesis with the Zermelo-Fraenkel Axioms: the Constructible Sets L
Cardinal and Ordinal Numbers Math 6300
5. the Axiom of Choice and Cardinal Arithmetic
Regular Cardinals in Models of Zf 43
THE INFINITE Thomas Jech
Singular Cardinal Combinatorics
EARLY HISTORY of the GENERALIZED CONTINUUM HYPOTHESIS: 1878-1938 Author(S): GREGORY H
SINGULAR CARDINALS and the PCF THEORY Thomas Jech 1
Notes on Set Theory
Measurable Cardinal Wikipedia Contents
What Is Cantor's Continuum Problem? on Kurt Gödel's Article of the Same Title
Even Ordinals and the Kunen Inconsistency
Are We Closer to a Solution of the Continuum Problem? Carlos Augusto
Disproof of the Continuum Hypothesis and Determination of the Cardinality of Continuum by Approximations of Sets
Proofs of Uncountability of the Reals
ZFC Set Theory and the Category of Sets Foundations for the Working Mathematician
Inner Models for Large Cardinals
Asymptotic Quasi-Completeness and ZFC Mirna Džamonja, Marco Panza
Large Cardinals with Forcing
Oberlin1279129907.Pdf (220.53
Arxiv:Math/9201251V1 [Math.LO] 15 Jan 1992 H Hoe Antral Eudrto Ntefaeoko C of Framework the in Understood Be Really Cannot Theorem the Hoe A
Chapter 4. Cardinal Arithmetic.∗
What Is Mathematics: Gödel's Theorem and Around Hyper-Textbook for Students
THE FINE STRUCTURE of Tile CONSTRUCTIBLE HIERARCHY *
FORCING and the CONTINUUM HYPOTHESIS Contents 1
The Unprovability of the Continuum Hypothesis Using the Method of Forcing
The First Measurable Cardinal Can Be the First Uncountable Regular Cardinal at Any Successor Height
Gödel's Constructible Universe
Covering at Limit Cardinals of K
The Axioms of Set Theory ZFC