Monotone principle of forked points and its consequences

Monotone principle of forked points and its consequences

This paper presents applications of the Axiom of Infinite Choice: Given any set P, there exist at least countable choice functions or there exist at least finite choice functions. The author continues herein with the further study of two papers of the Axiom of Choice in order by E. Ze rme l o [Neuer...

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Bibliographic Details
Main Author: Tašković Milan R.
Format: Article
Language:English
Published: University of Kragujevac, Faculty of Technical Sciences Čačak 2015-01-01
Series:Mathematica Moravica
Subjects:
the axiom of infinite choice
Zermelo's axiom of choice
Lemma of infinite maximality
Zorn's lemma
Foundation of the fixed point theory
fixed point theorems
topological spaces
Forked monotone principles
Brouwer theorem
Schauder theorem
forks theory
Online Access:http://scindeks-clanci.ceon.rs/data/pdf/1450-5932/2015/1450-59321502113T.pdf
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Summary:This paper presents applications of the Axiom of Infinite Choice: Given any set P, there exist at least countable choice functions or there exist at least finite choice functions. The author continues herein with the further study of two papers of the Axiom of Choice in order by E. Ze rme l o [Neuer Beweis für die Möglichkeit einer Wohlordung, Math. Annalen, 65 (1908), 107-128; translated in van Heijenoort 1967, 183-198], and by M. Taskovic [The axiom of choice, fixed point theorems, and inductive ordered sets, Proc. Amer. Math. Soc., 116 (1992), 897-904]. Monotone principle of forked points is a direct consequence of the Axiom of Infinite Choice, i.e., of the Lemma of Infinite Maximality! Brouwer and Schauder theorems are two direct censequences of the monotone principle od forked points.
ISSN:1450-5932
2560-5542

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