Difference between revisions of "Library"
From Cantor's Attic
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MRCLASS = {02K35 (04A20)}, | MRCLASS = {02K35 (04A20)}, | ||
MRNUMBER = {0460120 (57 \#116)}, | MRNUMBER = {0460120 (57 \#116)}, | ||
− | MRREVIEWER = {Thomas J. Jech} | + | MRREVIEWER = {Thomas J. Jech} |
} | } | ||
#BagariaCasacubertaMathiasRosicky2012:OrthogonalityClasses bibtex=@unpublished {BagariaCasacubertaMathiasRosicky2012:OrthogonalityClasses, | #BagariaCasacubertaMathiasRosicky2012:OrthogonalityClasses bibtex=@unpublished {BagariaCasacubertaMathiasRosicky2012:OrthogonalityClasses, | ||
− | AUTHOR = {Bagaria, Joan and Casacuberta, Carles and | + | AUTHOR = {Bagaria, Joan and Casacuberta, Carles and Mathias, A. R. D. and Rosicky, Jirí}, |
− | + | TITLE = "Definable orthogonality classes in accessible categories are small", | |
− | TITLE = "Definable orthogonality classes in accessible categories are | + | |
− | + | ||
NOTE = "submitted for publication", | NOTE = "submitted for publication", | ||
url = {http://arxiv.org/abs/1101.2792} | url = {http://arxiv.org/abs/1101.2792} | ||
Line 53: | Line 51: | ||
AUTHOR = {Baumgartner, James}, | AUTHOR = {Baumgartner, James}, | ||
TITLE = {Ineffability properties of cardinals. I}, | TITLE = {Ineffability properties of cardinals. I}, | ||
− | BOOKTITLE = {Infinite and finite sets (Colloq., Keszthely, 1973; | + | BOOKTITLE = {Infinite and finite sets (Colloq., Keszthely, 1973; dedicated to P. Erdős on his 60th birthday), Vol. I}, |
− | + | ||
− | + | ||
PAGES = {109--130. Colloq. Math. Soc. János Bolyai, Vol. 10}, | PAGES = {109--130. Colloq. Math. Soc. János Bolyai, Vol. 10}, | ||
PUBLISHER = {North-Holland}, | PUBLISHER = {North-Holland}, |
Revision as of 18:48, 23 July 2013
Welcome to the library, our central repository for references cited here on Cantor's attic.
Library holdings
- Abramson, Fred and Harrington, Leo and Kleinberg, Eugene and Zwicker, William. Flipping properties: a unifying thread in the theory of large cardinals. Ann Math Logic 12(1):25--58, 1977. MR bibtex
- Bagaria, Joan and Casacuberta, Carles and Mathias, A R D and Rosicky, Jirí. Definable orthogonality classes in accessible categories are small. Unpublished (submitted for publication) www bibtex
- Bagaria, Joan and Hamkins, Joel David and Tsaprounis, Konstantinos and Usuba, Toshimichi. Superstrong and other large cardinals are never {Laver} indestructible. www arχiv bibtex
- Baumgartner, James. Ineffability properties of cardinals. I. Infinite and finite sets (Colloq., Keszthely, 1973; dedicated to P. Erdős on his 60th birthday), Vol. I, pp. 109--130. Colloq. Math. Soc. János Bolyai, Vol. 10, Amsterdam, 1975. MR bibtex
- Blass, Andreas. Chapter 6: Cardinal characteristics of the continuum. Handbook of Set Theory , 2010. www bibtex
- Cantor, Georg. Contributions to the Founding of the Theory of Transfinite Numbers. Dover, New York, 1955. (Original year was 1915) www bibtex
- Cody, Brent and Gitman, Victoria. Easton's theorem for Ramsey and strongly Ramsey cardinals. (In preparation) bibtex
- Corazza, Paul. The Wholeness Axiom and Laver sequences. Annals of Pure and Applied Logic pp. 157--260, October, 2000. bibtex
- Corazza, Paul. The gap between ${\rm I}_3$ and the wholeness axiom. Fund Math 179(1):43--60, 2003. www DOI MR bibtex
- Dodd, Anthony and Jensen, Ronald. The core model. Ann Math Logic 20(1):43--75, 1981. www DOI MR bibtex
- Erdős, Paul and Hajnal, Andras. Some remarks concerning our paper ``On the structure of set-mappings''. Non-existence of a two-valued $\sigma $-measure for the first uncountable inaccessible cardinal. Acta Math Acad Sci Hungar 13:223--226, 1962. MR bibtex
- Erdős, Paul and Hajnal, Andras. On the structure of set-mappings. Acta Math Acad Sci Hungar 9:111--131, 1958. MR bibtex
- Foreman, Matthew and Kanamori, Akihiro. Handbook of Set Theory. First, Springer, 2010. (This book is actually a compendium of articles from multiple authors) www bibtex
- Gaifman, Haim. Elementary embeddings of models of set-theory and certain subtheories. Axiomatic set theory (Proc. Sympos. Pure Math., Vol. XIII, Part II, Univ. California, Los Angeles, Calif., 1967), pp. 33--101, Providence R.I., 1974. MR bibtex
- Gitman, Victoria. Ramsey-like cardinals. The Journal of Symbolic Logic 76(2):519-540, 2011. www arχiv MR bibtex
- Gitman, Victoria and Welch, Philip. Ramsey-like cardinals II. J Symbolic Logic 76(2):541--560, 2011. www arχiv MR bibtex
- Gitman, Victoria and Johnstone, Thomas. Indestructibility for Ramsey and Ramsey-like cardinals. (In preparation) bibtex
- Goldblatt, Robert. Lectures on the Hyperreals. Springer, 1998. bibtex
- Goldstern, Martin and Shelah, Saharon. The Bounded Proper Forcing Axiom. J Symbolic Logic 60(1):58--73, 1995. www bibtex
- Hamkins, Joel David and Lewis, Andy. Infinite time Turing machines. J Symbolic Logic 65(2):567--604, 2000. www arχiv DOI MR bibtex
- Hamkins, Joel David. Infinite time Turing machines. Minds and Machines 12(4):521--539, 2002. (special issue devoted to hypercomputation) www arχiv bibtex
- Hamkins, Joel David. Supertask computation. Classical and new paradigms of computation and their complexity hierarchies23:141--158, Dordrecht, 2004. (Papers of the conference ``Foundations of the Formal Sciences III'' held in Vienna, September 21-24, 2001) www arχiv DOI MR bibtex
- Hamkins, Joel David. The wholeness axioms and V=HOD. Arch Math Logic 40(1):1--8, 2001. www arχiv DOI MR bibtex
- Hamkins, Joel David. Tall cardinals. MLQ Math Log Q 55(1):68--86, 2009. www DOI MR bibtex
- Hamkins, Joel David and Kirmayer, Greg and Perlmutter, Norman. Generalizations of the {Kunen} inconsistency. Annals of Pure and Applied Logic 163(12):1872 - 1890, 2012. www arχiv DOI bibtex
- Hamkins, Joel David and Johnstone, Thomas A. Resurrection axioms and uplifting cardinals. www arχiv bibtex
- Jech, Thomas J. Set Theory. Third, Springer-Verlag, Berlin, 2003. (The third millennium edition, revised and expanded) bibtex
- Jensen, Ronald and Kunen, Kenneth. Some combinatorial properties of $L$ and $V$. Unpublished, 1969. www bibtex
- Kanamori, Akihiro and Magidor, Menachem. The evolution of large cardinal axioms in set theory. Higher set theory (Proc. Conf., Math. Forschungsinst., Oberwolfach, 1977)669:99--275, Berlin, 1978. www MR bibtex
- Kanamori, Akihiro. The higher infinite. Second, Springer-Verlag, Berlin, 2009. (Large cardinals in set theory from their beginnings, Paperback reprint of the 2003 edition) www bibtex
- Kanamori, Akihiro and Reinhardt, William N and Solovay, Robert M. Strong axioms of infinity and elementary embeddings. , 1978. (In ''Annals of Mathematical Logic'', '''13'''(1978)) www bibtex
- Kunen, Kenneth. Saturated Ideals. J Symbolic Logic 43(1):65--76, 1978. www bibtex
- Laver, Richard. Implications between strong large cardinal axioms. Ann Math Logic 90(1--3):79--90, 1997. MR bibtex
- Mitchell, William J. The Covering Lemma. Handbook of Set Theory , 2001. www bibtex
- Miyamoto, Tadatoshi. A note on weak segments of PFA. Proceedings of the sixth Asian logic conference pp. 175--197, 1998. bibtex
- Sharpe, Ian and Welch, Philip. Greatly Erdős cardinals with some generalizations to the Chang and Ramsey properties. Ann Pure Appl Logic 162(11):863--902, 2011. www DOI MR bibtex
- Schanker, Jason A. Partial near supercompactness. Ann Pure Appl Logic , 2012. (In Press.) www DOI bibtex
- Schanker, Jason A. Weakly measurable cardinals. MLQ Math Log Q 57(3):266--280, 2011. www DOI bibtex
- Schanker, Jason A. Weakly measurable cardinals and partial near supercompactness. Ph.D. Thesis, CUNY Graduate Center, 2011. bibtex
- Schindler, Ralf-Dieter. Proper forcing and remarkable cardinals. Bull Symbolic Logic 6(2):176--184, 2000. www DOI MR bibtex
- Silver, Jack. A large cardinal in the constructible universe. Fund Math 69:93--100, 1970. MR bibtex
- Silver, Jack. Some applications of model theory in set theory. Ann Math Logic 3(1):45--110, 1971. MR bibtex
- Suzuki, Akira. Non-existence of generic elementary embeddings into the ground model. Tsukuba J Math 22(2):343--347, 1998. MR bibtex | Abstract
- Suzuki, Akira. No elementary embedding from $V$ into $V$ is definable from parameters. J Symbolic Logic 64(4):1591--1594, 1999. www DOI MR bibtex
- Welch, Philip. The Lengths of Infinite Time Turing Machine Computations. Bulletin of the London Mathematical Society 32(2):129--136, 2000. bibtex
- Welch, Philip. Eventually Infinite Time Turing Machine Degrees: Infinite Time Decidable reals. Journal of Symbolic Logic 65(3):1193--1203, 2000. bibtex
- Zapletal, Jindrich. A new proof of Kunen's inconsistency. Proc Amer Math Soc 124(7):2203--2204, 1996. www MR bibtex
User instructions
Cantor's attic users may make contributions to the library, in bibtex format, and then cite those references in other articles. Edit this page to make your contribution.