The permutations with n non-fixed points and the subsets with n elements of a set

IF 0.4 4区数学 Q4 LOGIC Mathematical Logic Quarterly Pub Date : 2023-08-04 DOI:10.1002/malq.202300005

Supakun Panasawatwong, Pimpen Vejjajiva

{"title":"The permutations with n non-fixed points and the subsets with n elements of a set","authors":"Supakun Panasawatwong, Pimpen Vejjajiva","doi":"10.1002/malq.202300005","DOIUrl":null,"url":null,"abstract":"We write <math>\n <semantics>\n <mrow>\n <msub>\n <mi>S</mi>\n <mi>n</mi>\n </msub>\n <mrow>\n <mo>(</mo>\n <mi>a</mi>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation>$\\mathcal {S}_n(\\mathfrak {a})$</annotation>\n </semantics></math> and <math>\n <semantics>\n <msup>\n <mrow>\n <mo>[</mo>\n <mi>a</mi>\n <mo>]</mo>\n </mrow>\n <mi>n</mi>\n </msup>\n <annotation>$[\\mathfrak {a}]^n$</annotation>\n </semantics></math> for the cardinalities of the set of permutations with n non-fixed points and the set of subsets with n elements, respectively, of a set which is of cardinality <math>\n <semantics>\n <mi>a</mi>\n <annotation>$\\mathfrak {a}$</annotation>\n </semantics></math>, where n is a natural number greater than 1. With the Axiom of Choice, <math>\n <semantics>\n <mrow>\n <msub>\n <mi>S</mi>\n <mi>n</mi>\n </msub>\n <mrow>\n <mo>(</mo>\n <mi>a</mi>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation>$\\mathcal {S}_n(\\mathfrak {a})$</annotation>\n </semantics></math> and <math>\n <semantics>\n <msup>\n <mrow>\n <mo>[</mo>\n <mi>a</mi>\n <mo>]</mo>\n </mrow>\n <mi>n</mi>\n </msup>\n <annotation>$[\\mathfrak {a}]^n$</annotation>\n </semantics></math> are equal for all infinite cardinals <math>\n <semantics>\n <mi>a</mi>\n <annotation>$\\mathfrak {a}$</annotation>\n </semantics></math>. We show, in ZF, that if <math>\n <semantics>\n <msub>\n <mtext>AC</mtext>\n <mrow>\n <mo>≤</mo>\n <mi>n</mi>\n </mrow>\n </msub>\n <annotation>$\\mbox{\\textsf {AC}}_{\\le n}$</annotation>\n </semantics></math> is assumed, then <math>\n <semantics>\n <mrow>\n <msup>\n <mrow>\n <mo>[</mo>\n <mi>a</mi>\n <mo>]</mo>\n </mrow>\n <mi>n</mi>\n </msup>\n <mo>≤</mo>\n <msub>\n <mi>S</mi>\n <mi>n</mi>\n </msub>\n <mrow>\n <mo>(</mo>\n <mi>a</mi>\n <mo>)</mo>\n </mrow>\n <mo>≤</mo>\n <msup>\n <mrow>\n <mo>[</mo>\n <mi>a</mi>\n <mo>]</mo>\n </mrow>\n <mrow>\n <mi>n</mi>\n <mo>+</mo>\n <mn>1</mn>\n </mrow>\n </msup>\n </mrow>\n <annotation>$[\\mathfrak {a}]^n\\le \\mathcal {S}_n(\\mathfrak {a})\\le [\\mathfrak {a}]^{n+1}$</annotation>\n </semantics></math> for any infinite cardinal <math>\n <semantics>\n <mi>a</mi>\n <annotation>$\\mathfrak {a}$</annotation>\n </semantics></math>. Moreover, the assumption <math>\n <semantics>\n <msub>\n <mtext>AC</mtext>\n <mrow>\n <mo>≤</mo>\n <mi>n</mi>\n </mrow>\n </msub>\n <annotation>$\\mbox{\\textsf {AC}}_{\\le n}$</annotation>\n </semantics></math> cannot be removed for <math>\n <semantics>\n <mrow>\n <mi>n</mi>\n <mo>></mo>\n <mn>2</mn>\n </mrow>\n <annotation>$n>2$</annotation>\n </semantics></math> and the superscript <math>\n <semantics>\n <mrow>\n <mi>n</mi>\n <mo>+</mo>\n <mn>1</mn>\n </mrow>\n <annotation>$n+1$</annotation>\n </semantics></math> cannot be replaced by n. We also show under <math>\n <semantics>\n <msub>\n <mtext>AC</mtext>\n <mrow>\n <mo>≤</mo>\n <mi>n</mi>\n </mrow>\n </msub>\n <annotation>$\\mbox{\\textsf {AC}}_{\\le n}$</annotation>\n </semantics></math> that for any infinite cardinal <math>\n <semantics>\n <mi>a</mi>\n <annotation>$\\mathfrak {a}$</annotation>\n </semantics></math>, <math>\n <semantics>\n <mrow>\n <msub>\n <mi>S</mi>\n <mi>n</mi>\n </msub>\n <mrow>\n <mo>(</mo>\n <mi>a</mi>\n <mo>)</mo>\n </mrow>\n <mo>≤</mo>\n <msup>\n <mrow>\n <mo>[</mo>\n <mi>a</mi>\n <mo>]</mo>\n </mrow>\n <mi>n</mi>\n </msup>\n </mrow>\n <annotation>$\\mathcal {S}_n(\\mathfrak {a})\\le [\\mathfrak {a}]^n$</annotation>\n </semantics></math> implies <math>\n <semantics>\n <mi>a</mi>\n <annotation>$\\mathfrak {a}$</annotation>\n </semantics></math> is Dedekind-infinite.","PeriodicalId":49864,"journal":{"name":"Mathematical Logic Quarterly","volume":"69 3","pages":"341-346"},"PeriodicalIF":0.4000,"publicationDate":"2023-08-04","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Mathematical Logic Quarterly","FirstCategoryId":"100","ListUrlMain":"https://onlinelibrary.wiley.com/doi/10.1002/malq.202300005","RegionNum":4,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q4","JCRName":"LOGIC","Score":null,"Total":0}

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Abstract

We write $S_{n} (a)$ and ${[a]}^{n}$ for the cardinalities of the set of permutations with n non-fixed points and the set of subsets with n elements, respectively, of a set which is of cardinality $a$ , where n is a natural number greater than 1. With the Axiom of Choice, $S_{n} (a)$ and ${[a]}^{n}$ are equal for all infinite cardinals $a$ . We show, in ZF, that if ${AC}_{\leq n}$ is assumed, then ${[a]}^{n} \leq S_{n} (a) \leq {[a]}^{n + 1}$ for any infinite cardinal $a$ . Moreover, the assumption ${AC}_{\leq n}$ cannot be removed for $n > 2$ and the superscript $n + 1$ cannot be replaced by n. We also show under ${AC}_{\leq n}$ that for any infinite cardinal $a$ , $S_{n} (a) \leq {[a]}^{n}$ implies $a$ is Dedekind-infinite.

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集合的n个非不动点的置换和n个元素的子集

我们写S n（a）$\mathcal{S}_n（\mathfrak｛a｝）$和[a]n$[\mathfrak｛a}]^n$分别用于具有n个非不动点的排列集和具有n个元素的子集集的基数，基数为$\mathfrak｛a｝$的集合，其中n是大于1的自然数。关于选择公理，S n（a）$\mathcal{S}_n（\mathfrak{a｝）$和[a]n$[\mathfrak{a｝]^n$对于所有无限基数a$\mathfrak{a｝$都相等。我们在ZF中证明，如果假设AC≤n$\mbox｛\textsf｛AC｝｝_｛\le n｝$，则[a]n≤S n（a）≤[a]n+1$[\mathfrak｛a｝]^n\le\mathcal{S}_n（\mathfrak｛a｝）\le[\mathfrak｛a}]^｛n+1｝$对于任何无穷基数a$\mathfrak{a｝$。此外，对于n>；2$n>；2$和上标n+1$n+1$不能用n代替。我们还证明了在AC≤n$\mbox｛\textsf｛AC｝｝_，S n（a）≤[a]n$\mathcal{S}_n（\mathfrak｛a｝）\le[\mathfrak｛a}]^n$表示$\mathfrak{a｝$是Dedekind无穷大。

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来源期刊

Mathematical Logic Quarterly 数学-数学

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0.60

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0.00%

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审稿时长

>12 weeks

期刊介绍： Mathematical Logic Quarterly publishes original contributions on mathematical logic and foundations of mathematics and related areas, such as general logic, model theory, recursion theory, set theory, proof theory and constructive mathematics, algebraic logic, nonstandard models, and logical aspects of theoretical computer science.

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