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A Non-Standard Analysis of a Cultural Icon: The Case of Paul Halmos
Authors:Piotr Błaszczyk  Alexandre Borovik  Vladimir Kanovei  Mikhail G. Katz  Taras Kudryk  Semen S. Kutateladze  David Sherry
Affiliation:1.Institute of Mathematics,Pedagogical University of Cracow,Cracow,Poland;2.School of Mathematics,University of Manchester,Manchester,United Kingdom;3.IPPI, Moscow, and MIIT,Moscow,Russia;4.Department of Mathematics,Bar Ilan University,Ramat Gan,Israel;5.Department of Mathematics,Lviv National University,Lviv,Ukraine;6.Sobolev Institute of Mathematics,Novosibirsk State University,Novosibirsk,Russia;7.Department of Philosophy,Northern Arizona University,Flagstaff,USA
Abstract:We examine Paul Halmos’ comments on category theory, Dedekind cuts, devil worship, logic, and Robinson’s infinitesimals. Halmos’ scepticism about category theory derives from his philosophical position of naive set-theoretic realism. In the words of an MAA biography, Halmos thought that mathematics is “certainty” and “architecture” yet 20th century logic teaches us is that mathematics is full of uncertainty or more precisely incompleteness. If the term architecture meant to imply that mathematics is one great solid castle, then modern logic tends to teach us the opposite lesson, namely that the castle is floating in midair. Halmos’ realism tends to color his judgment of purely scientific aspects of logic and the way it is practiced and applied. He often expressed distaste for nonstandard models, and made a sustained effort to eliminate first-order logic, the logicians’ concept of interpretation, and the syntactic vs semantic distinction. He felt that these were vague, and sought to replace them all by his polyadic algebra. Halmos claimed that Robinson’s framework is “unnecessary” but Henson and Keisler argue that Robinson’s framework allows one to dig deeper into set-theoretic resources than is common in Archimedean mathematics. This can potentially prove theorems not accessible by standard methods, undermining Halmos’ criticisms.
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