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Inaccessible cardinal
Are Large Cardinal Axioms Restrictive?
Set-Theoretical Background 1.1 Ordinals and Cardinals
Florida State University Libraries
SET THEORY for CATEGORY THEORY 3 the Category Is Well-Powered, Meaning That Each Object Has Only a Set of Iso- Morphism Classes of Subobjects
How Set Theory Impinges on Logic
Arxiv:2009.07164V1 [Math.LO] 15 Sep 2020 Ai—U Nta Eeyb Etoigfaue Htuiul Char Uniquely That Isomorphism
Arxiv:Math/0009240V1
TOPICS in SET THEORY: Example Sheet
Incompatible Ω-Complete Theories∗
AN Ω-LOGIC PRIMER Introduction One Family of Results in Modern Set
Constructing Cardinals from Below
Large Cardinals and the Iterative Conception of Set
Higher-Order Tarski Grothendieck As a Foundation for Formal Proof Chad E
Does Mathematics Need New Axioms?
Math655 Lecture Notes: Part 1.0 Inaccessible Cardinals
Childs Axiomatizes a Set Theory, XST, That Diff
On Grothendieck Universes Compositio Mathematica, Tome 21, No 1 (1969), P
Infinite Goldie Dimensions
Top View
What Are Strong Axioms of Infinity and Why Are They Useful in Mathematics?
Logic/Set Theory II - Ordinals and Cardinals
Incompleteness Theorems, Large Cardinals, and Automata Over Finite Words Olivier Finkel
INTRODUCTION to LARGE CARDINALS the Aim of This Talk Is
Some Intuition Behind Large Cardinal Axioms, Their Characterization, and Related Results
Levy and Set Theory
A Coloring Theorem for Inaccessible Cardinals a Dissertation Presented
Gitik Used a Cardinal
Notes on Set Theory
Large Cardinals in Mathematics and Infinite Combinatorics
Are We Closer to a Solution of the Continuum Problem? Carlos Augusto
ZFC Set Theory and the Category of Sets Foundations for the Working Mathematician
Feferman's Forays Into the Foundations of Category Theory
Inner Models for Large Cardinals
Oberlin1279129907.Pdf (220.53
DOUBLE WEAKNESS 3 Weak Diamond at Strongly Inaccessibles and We Settle the Question of Weakly Inaccessibles by Covering the Last Open Case Concerning These Cardinals
Sets, Classes and Categories
Grothendieck Universes and the Super-Complete Models of Shepherdson Compositio Mathematica, Tome 17 (1965-1966), P
Chart of Cardinals