A Non-Standard Analysis of a Cultural Icon: The Case of Paul Halmos

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.

[1]  Mikhail G. Katz,et al.  Differential geometry via infinitesimal displacements , 2014, J. Log. Anal..

[2]  Paul R. Halmos Does mathematics have elements? , 1982, Bulletin of the Australian Mathematical Society.

[3]  Emanuele Bottazzi,et al.  Fermat, Leibniz, Euler, and the gang: The true history of the concepts of limit and shadow , 2014, 1407.0233.

[4]  Mikhail G. Katz,et al.  Commuting and Noncommuting Infinitesimals , 2013, Am. Math. Mon..

[5]  Vladimir Kanovei,et al.  Proofs and Retributions, Or: Why Sarah Can’t Take Limits , 2015 .

[6]  Paul R. Halmos,et al.  I Want to Be A Mathematician: An Automathography , 1986 .

[7]  Paul R. Halmos Has progress in mathematics slowed down , 1990 .

[8]  Abraham Robinson Selected papers of Abraham Robinson , 1978 .

[9]  Ton Lindstrøm Nonstandard Analysis and its Applications: AN INVITATION TO NONSTANDARD ANALYSIS , 1988 .

[10]  Peter A. Loeb,et al.  Conversion from nonstandard to standard measure spaces and applications in probability theory , 1975 .

[11]  H. Jerome Keisler,et al.  On the strength of nonstandard analysis , 1986, Journal of Symbolic Logic.

[12]  Edwin Hewitt,et al.  Rings of real-valued continuous functions. I , 1948 .

[13]  Paul R. Halmos,et al.  Invariant subspaces of polynomially compact operators. , 1966 .

[14]  Paul R. Halmos,et al.  I Want to be a Mathematician , 1985 .

[15]  J. Fenstad Representations of Probabilities Defined on First Order Languages , 1967 .

[16]  Leonard Gillman,et al.  Selecta : expository writing , 1985 .

[17]  Joseph W. Dauben,et al.  Abraham Robinson: The Creation of Nonstandard Analysis, A Personal and Mathematical Odyssey , 1995 .

[18]  Vladimir Kanovei,et al.  Tools, Objects, and Chimeras: Connes on the Role of Hyperreals in Mathematics , 2012, 1211.0244.

[19]  Paul R. Halmos,et al.  An autobiography of Polyadic Algebras , 2000, Log. J. IGPL.

[20]  W. Luxemburg Non-Standard Analysis , 1977 .

[21]  Mikhail G. Katz,et al.  Meaning in Classical Mathematics: Is it at Odds with Intuitionism? , 2011, 1110.5456.

[22]  Donald J. Albers,et al.  Paul Halmos: Maverick Mathologist , 1982 .

[23]  Edward Nelson Dynamical Theories of Brownian Motion , 1967 .

[24]  Abraham Robinson,et al.  Solution of an invariant subspace problem of K , 1966 .

[25]  W. A. J. Luxemburg,et al.  Two applications of the method of construction by ultrapowers to analysis , 1962 .

[26]  Terence Tao,et al.  Sum-avoiding sets in groups , 2016, 1603.03068.

[27]  V. I. Lomonosov,et al.  Invariant subspaces for the family of operators which commute with a completely continuous operator , 1973 .

[28]  Abraham Robinson,et al.  Nonstandard analysis and philosophy , 1979 .

[29]  Paul R. Halmos Applied Mathematics is Bad Mathematics , 1981 .

[30]  N. Aronszajn,et al.  INVARIANT SUBSPACES OF COMPLETELY CONTINOUS OPERATIONS , 1954 .

[31]  Martin Davis,et al.  Applied Nonstandard Analysis , 1977 .

[32]  Hisahiro Tamano,et al.  On Rings of Real Valued Continuous Functions , 1958 .

[33]  Fred Jerome,et al.  Einstein, Race, and the Myth of the Cultural Icon , 2004, Isis.

[34]  Mikhail G. Katz,et al.  A Burgessian Critique of Nominalistic Tendencies in Contemporary Mathematics and its Historiography , 2011, 1104.0375.

[35]  E. I. Gordon Nonstandard Methods in Commutative Harmonic Analysis , 1997 .