Factorials of infinite cardinals in zf part II: Consistency results
Abstract
For a set x, let S(x) be the set of all permutations of x. We prove by the method of permutation models that the following statements are consistent with ZF: (1) There is an infinite set x such that |p(x)|<|S(x)|<|seq^1-1(x)|<|seq(x)|, where p(x) is the powerset of x, seq(x) is the set of all finite sequences of elements of x, and seq^1-1(x) is the set of all finite sequences of elements of x without repetition.(2) There is a Dedekind infinite set x such that |S(x)|<|[x]^3| and such that there exists a surjection from x onto S(x). (3) There is an infinite set x such that there is a finite-to-one function from S(x) into x.Other Versions
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How can I increase my downloads?Citations of this work
Cantor’s Theorem May Fail for Finitary Partitions.Guozhen Shen -forthcoming -Journal of Symbolic Logic:1-18.
The power set and the set of permutations with finitely many non‐fixed points of a set.Guozhen Shen -2023 -Mathematical Logic Quarterly 69 (1):40-45.
A Generalized Cantor Theorem In.Yinhe Peng &Guozhen Shen -2024 -Journal of Symbolic Logic 89 (1):204-210.
The permutations withn non‐fixed points and the subsets withn elements of a set.Supakun Panasawatwong &Pimpen Vejjajiva -2023 -Mathematical Logic Quarterly 69 (3):341-346.
Remarks on infinite factorials and cardinal subtraction in ZF$\mathsf{ZF}$.Guozhen Shen -2022 -Mathematical Logic Quarterly 68 (1):67-73.
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