{"title":"A note on surjective cardinals","authors":"Jiaheng Jin, Guozhen Shen","doi":"arxiv-2408.04287","DOIUrl":null,"url":null,"abstract":"For cardinals $\\mathfrak{a}$ and $\\mathfrak{b}$, we write\n$\\mathfrak{a}=^\\ast\\mathfrak{b}$ if there are sets $A$ and $B$ of cardinalities\n$\\mathfrak{a}$ and $\\mathfrak{b}$, respectively, such that there are partial\nsurjections from $A$ onto $B$ and from $B$ onto $A$. $=^\\ast$-equivalence\nclasses are called surjective cardinals. In this article, we show that\n$\\mathsf{ZF}+\\mathsf{DC}_\\kappa$, where $\\kappa$ is a fixed aleph, cannot prove\nthat surjective cardinals form a cardinal algebra, which gives a negative\nsolution to a question proposed by Truss [J. Truss, Ann. Pure Appl. Logic 27,\n165--207 (1984)]. Nevertheless, we show that surjective cardinals form a\n``surjective cardinal algebra'', whose postulates are almost the same with\nthose of a cardinal algebra, except that the refinement postulate is replaced\nby the finite refinement postulate. This yields a smoother proof of the\ncancellation law for surjective cardinals, which states that\n$m\\cdot\\mathfrak{a}=^\\ast m\\cdot\\mathfrak{b}$ implies\n$\\mathfrak{a}=^\\ast\\mathfrak{b}$ for all cardinals $\\mathfrak{a},\\mathfrak{b}$\nand all nonzero natural numbers $m$.","PeriodicalId":501306,"journal":{"name":"arXiv - MATH - Logic","volume":"18 1","pages":""},"PeriodicalIF":0.0000,"publicationDate":"2024-08-08","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"arXiv - MATH - Logic","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/arxiv-2408.04287","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 0
Abstract
For cardinals $\mathfrak{a}$ and $\mathfrak{b}$, we write
$\mathfrak{a}=^\ast\mathfrak{b}$ if there are sets $A$ and $B$ of cardinalities
$\mathfrak{a}$ and $\mathfrak{b}$, respectively, such that there are partial
surjections from $A$ onto $B$ and from $B$ onto $A$. $=^\ast$-equivalence
classes are called surjective cardinals. In this article, we show that
$\mathsf{ZF}+\mathsf{DC}_\kappa$, where $\kappa$ is a fixed aleph, cannot prove
that surjective cardinals form a cardinal algebra, which gives a negative
solution to a question proposed by Truss [J. Truss, Ann. Pure Appl. Logic 27,
165--207 (1984)]. Nevertheless, we show that surjective cardinals form a
``surjective cardinal algebra'', whose postulates are almost the same with
those of a cardinal algebra, except that the refinement postulate is replaced
by the finite refinement postulate. This yields a smoother proof of the
cancellation law for surjective cardinals, which states that
$m\cdot\mathfrak{a}=^\ast m\cdot\mathfrak{b}$ implies
$\mathfrak{a}=^\ast\mathfrak{b}$ for all cardinals $\mathfrak{a},\mathfrak{b}$
and all nonzero natural numbers $m$.
对于红心$\mathfrak{a}$和$\mathfrak{b}$,如果存在红心分别为$\mathfrak{a}$和$\mathfrak{b}$的集合$A$和$B$,从而存在从$A$到$B$和从$B$到$A$的偏射,我们就写$\mathfrak{a}=^\ast\mathfrak{b}$。$=^\ast$-等价类被称为投射红心。在本文中,我们证明了$\mathsf{ZF}+\mathsf{DC}_\kappa$,其中$\kappa$是一个固定的aleph,不能证明投射红心构成了一个红心代数,这给出了特鲁斯[J. Truss, Ann. Pure Appl. Logic 27,165--207 (1984)]提出的一个问题的否定解答。然而,我们证明了投射红心构成了一个 "投射红心代数",其公设与红心代数的公设几乎相同,只是细化公设被有限细化公设所取代。对于所有的红心数$\mathfrak{a}, \mathfrak{b}$和所有非零自然数$m$来说,这意味着$\mathfrak{a}=^\ast\mathfrak{b}$。