A non reductionist logicism with explicit definitions


Autoria(s): Joray, Pierre
Data(s)

11/03/2016

11/03/2016

2013

Resumo

This paper introduces and examines the logicist construction of Peano Arithmetic that can be performed into Leśniewski’s logical calculus of names called Ontology. Against neo-Fregeans, it is argued that a logicist program cannot be based on implicit definitions of the mathematical concepts. Using only explicit definitions, the construction to be presented here constitutes a real reduction of arithmetic to Leśniewski’s logic with the addition of an axiom of infinity. I argue however that such a program is not reductionist, for it only provides what I will call a picture of arithmetic, that is to say a specific interpretation of arithmetic in which purely logical entities play the role of natural numbers. The reduction does not show that arithmetic is simply a part of logic. The process is not of ontological significance, for numbers are not shown to be logical entities. This neo-logicist program nevertheless shows the existence of a purely analytical route to the knowledge of arithmetical laws.

Identificador

Joray, P. (2013). A non reductionist logicism with explicit definitions. Dans Fradet et Lepage (dir.), "La crise des fondements : quelle crise?". Montréal, Québec : Les Cahiers d'Ithaque.

http://revueithaque.org/fichiers/cahiers/Lepage_Fradet.pdf

http://hdl.handle.net/1866/13308

Idioma(s)

en

Relação

Les Cahiers d'Ithaque; 2013.

Direitos

Ce texte est publié sous licence Creative Commons : Attribution – Pas d’utilisation commerciale – Partage dans les mêmes conditions 2.5 Canada.

http://creativecommons.org/licenses/by-nc-sa/2.5/ca/legalcode.fr

Tipo

Article