David Bourget (Western Ontario)
David Chalmers (ANU, NYU)
Rafael De Clercq
Jack Alan Reynolds
Learn more about PhilPapers
Bulletin of Symbolic Logic 6 (1):45-66 (2000)
Julius König is famous for his mistaken attempt to demonstrate that the continuum hypothesis was false. It is also known that the only positive result that could have survived from his proof is the paradox which bears his name. Less famous is his 1914 book Neue Grundlagen der Logik, Arithmetik und Mengenlehre. Still, it contains original contributions to logic, like the concept of metatheory and the solution of paradoxes based on the refusal of the law of bivalence. We are going to discover them by analysing the content of the book
|Keywords||No keywords specified (fix it)|
|Categories||categorize this paper)|
Setup an account with your affiliations in order to access resources via your University's proxy server
Configure custom proxy (use this if your affiliation does not provide a proxy)
|Through your library|
References found in this work BETA
No references found.
Citations of this work BETA
No citations found.
Similar books and articles
Jochen Dörre, Esther König & Dov Gabbay (1996). Fibred Semantics for Feature-Based Grammar Logic. Journal of Logic, Language and Information 5 (3-4):387-422.
Esther König & Andreas Mengel (2000). Linguistic Databases, John Nerbonne, Ed. Journal of Logic, Language and Information 9 (4):513-517.
Robert H. Cowen (1977). Generalizing König's Infinity Lemma. Notre Dame Journal of Formal Logic 18 (2):243-247.
Josef Berger (2008). The Weak König Lemma and Uniform Continuity. Journal of Symbolic Logic 73 (3):933-939.
Bernhard König (2007). Forcing Indestructibility of Set-Theoretic Axioms. Journal of Symbolic Logic 72 (1):349 - 360.
Nicholas J. J. Smith (2000). The Principle of Uniform Solution (of the Paradoxes of Self-Reference). Mind 109 (433):117-122.
Gert König (1972). Inductive Logic. Foundations and Assumptions. Philosophy and History 5 (2):137-138.
Hajime Ishihara (2006). Weak König's Lemma Implies Brouwer's Fan Theorem: A Direct Proof. Notre Dame Journal of Formal Logic 47 (2):249-252.
Kazuyuki Tanaka & Takeshi Yamazaki (2000). A Non-Standard Construction of Haar Measure and Weak König's Lemma. Journal of Symbolic Logic 65 (1):173-186.
Richard Heck (2005). Julius Caesar and Basic Law V. Dialectica 59 (2):161–178.
Sorry, there are not enough data points to plot this chart.
Added to index2009-01-28
Total downloads1 ( #434,761 of 1,098,987 )
Recent downloads (6 months)0
How can I increase my downloads?