Higher-Order Skolem’s Paradoxes and the Practice of Mathematics: a Note

&
Disputatio 14 (64):41-49 (2022)
  Copy   BIBTEX

Abstract

We will formulate some analogous higher-order versions of Skolem’s paradox and assess the generalizability of two solutions for Skolem’s paradox to these paradoxes: the textbook approach and that of Bays (2000). We argue that the textbook approach to handle Skolem’s paradox cannot be generalized to solve the parallel higher-order paradoxes, unless it is augmented by the claim that there is no unique language within which the practice of mathematics can be formalized. Then, we argue that Bays’ solution to the original Skolem’s paradox, unlike the textbook solution, can be generalized to solve the higher-order paradoxes without any implication about the possibility or order of a language in which mathematical practice is to be formalized.

Categories

Add categories

Keywords

Reprint years

DOI

10.2478/disp-2022-0003

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 92,283

External links

Setup an account with your affiliations in order to access resources via your University's proxy server

Through your library

My notes

Similar books and articles

Higher-Order Skolem’s Paradoxes.Davood Hosseini & Mansooreh Kimiagari - manuscript
Foundations without foundationalism: a case for second-order logic.Stewart Shapiro - 1991 - New York: Oxford University Press.
I—Columnar Higher-Order Vagueness, or Vagueness is Higher-Order Vagueness.Susanne Bobzien - 2015 - Aristotelian Society Supplementary Volume 89 (1):61-87.
Higher-Order Vagueness and Borderline Nestings: A Persistent Confusion.Susanne Bobzien - 2013 - Analytic Philosophy 54 (1):1-43.
Higher-order free logic and the Prior-Kaplan paradox.Andrew Bacon, John Hawthorne & Gabriel Uzquiano - 2016 - Canadian Journal of Philosophy 46 (4-5):493-541.
Inclosures, Vagueness, and Self-Reference.Graham Priest - 2010 - Notre Dame Journal of Formal Logic 51 (1):69-84.
Contextualism about vagueness and higher-order vagueness.Patrick Greenough - 2005 - Aristotelian Society Supplementary Volume 79 (1):167–190.
INVENTING LOGIC: THE LÖWENHEIM-SKOLEM THEOREM AND FIRST- AND SECOND-ORDER LOGIC.Valérie Lynn Therrien - 2012 - Pensées Canadiennes 10.
II—Patrick Greenough: Contextualism about Vagueness and Higher‐order Vagueness.Stewart Shapiro & Patrick Greenough - 2005 - Aristotelian Society Supplementary Volume 79 (1):167-190.
Why the vague need not be higher-order vague.Michael Tye - 1994 - Mind 103 (409):43-45.
The Illusion of Higher-Order Vagueness.Crispin Wright - 2009 - In Richard Dietz & Sebastiano Moruzzi (eds.), Cuts and Clouds. Vagueness, its Nature and its Logic. Oxford University Press.
A Case For Higher-Order Metaphysics.Andrew Bacon - 2024 - In Peter Fritz & Nicholas K. Jones (eds.), Higher-Order Metaphysics. Oxford University Press.
Higher Order Modal Logic.Reinhard Muskens - 2006 - In Patrick Blackburn, Johan Van Benthem & Frank Wolter (eds.), Handbook of Modal Logic. Elsevier. pp. 621-653.
Higher-order uncertainty.Kevin Dorst - 2019 - In Mattias Skipper & Asbjørn Steglich-Petersen (eds.), Higher-Order Evidence: New Essays. Oxford, United Kingdom: Oxford University Press.
Solving Higher-Order Equations: From Logic to Programming.Christian Prehofer - 1998 - Springer Verlag.

Analytics

Added to PP
2022-08-30

Downloads
24 (#660,486)

6 months
8 (#370,225)

Historical graph of downloads
How can I increase my downloads?

Author Profiles

Mansooreh (Sophia) Kimiagari
University of Calgary
Davood Hosseini
Tarbiat Modares University

Citations of this work

No citations found.

Add more citations

References found in this work

Second-order languages and mathematical practice.Stewart Shapiro - 1985 - Journal of Symbolic Logic 50 (3):714-742.
Second-Order Languages and Mathematical Practice.Stewart Shapiro - 1989 - Journal of Symbolic Logic 54 (1):291-293.
Reflections on Skolem's Paradox.Timothy Bays - 2000 - Dissertation, University of California, Los Angeles
Skolem Redux.W. D. Hart - 2000 - Notre Dame Journal of Formal Logic 41 (4):399--414.

Add more references