Access the full text.
Sign up today, get DeepDyve free for 14 days.
R. Laver, S. Shelah (1981)
The ℵ2-Soulin hypothesisTrans. Am. Math. Soc., 264
(1982)
Reeecting stationary sets
(1973)
Solovay Squares with diamonds and Souslin trees with special squares, Fundamenta Mathematicae vol
Sh-g] S. Shelah, Cardinal Arithmetic, submitted to
(1986)
Solovay Squares with diamonds and Souslin treeswith special squares
(1976)
Higher Souslin Trees and the Generalized Continuum Hypotheses, The Journal of Symbolic Logic
(1982)
Generalized Martin Axiom and the Souslin Hypothesisfor higher cardinality
(1981)
Re ecting stationary sets
S. Shelah, L. Stanley (1988)
Weakly compact cardinals and nonspecial Aronszajn trees, 104
R. Jensen (1972)
The fine structure of the constructible hierarchyAnnals of Mathematical Logic, 4
K. Devlin, Håvard Johnsbråten (1974)
The Souslin problem
John Gregory (1976)
Higher Souslin trees and the generalized continuum hypothesisJournal of Symbolic Logic, 41
(1976)
Higher Souslin Trees and the Generalized Continuum Hypotheses The @ 2 -Souslin hypothesis
(1986)
Corrigendum toGeneralized Martin's Axiom and Souslin Hypothesis for Higher cardinality Weakly compact cardinals and non special Aronszajn trees
S. Shelah, L. Stanley (1982)
Generalized Martin’s Axiom and Souslin’s hypothesis for higher cardinalsIsrael Journal of Mathematics, 43
Sh 365] S. Shelah, There are Jonsson algebras in many inaccessible cardinals, a chapter in Cardinal Arithmetic
U. Abraham, S. Shelah, R. Solovay (1987)
Squares with diamonds and Souslin trees with special squaresFundamenta Mathematicae, 127
K. Devlin (1973)
Aspects of Constructibility
M. Magidor (1982)
Reflecting stationary setsJournal of Symbolic Logic, 47
There are Jonsson algebras in many inaccessible cardinals, a chapter in Cardinal Arithmetic
S. Shelah, L. Stanley (1986)
Corrigendum to “generalized martin’s axiom and souslin’s hypothesis for higher cardinals”Israel Journal of Mathematics, 53
Non Structure Theory
(1974)
Johnsbråten The Souslin Problem
R. Laver, S. Shelah (1981)
The ℵ₂-Souslin hypothesisTransactions of the American Mathematical Society, 264
T. Jech (1978)
Set Theory
We prove thatµ=µ <µ , 2 µ =µ + and “there is a non-reflecting stationary subset ofµ + composed of ordinals of cofinality <μ” imply that there is a μ-complete Souslin tree onµ +.
Archive for Mathematical Logic – Springer Journals
Published: Mar 11, 2005
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Copy and paste the desired citation format or use the link below to download a file formatted for EndNote
Access the full text.
Sign up today, get DeepDyve free for 14 days.
All DeepDyve websites use cookies to improve your online experience. They were placed on your computer when you launched this website. You can change your cookie settings through your browser.