TOWARD A MINIMALIST FOUNDATION FOR CONSTRUCTIVE MATHEMATICS

2005 ◽  
pp. 91-111 ◽  
Author(s):  
Maria Emilia Maietti ◽  
Giovanni Sambin
Keyword(s):  
Constructive Mathematics

scholarly journals Conceptions of Infinity and Set in Lorenzen’s Operationist System

2021 ◽  
pp. 23-46
Author(s):  
Carolin Antos
Keyword(s):  
Constructive Mathematics ◽  
Dialogical Logic ◽  
Actual Infinite ◽  
Potential Infinity ◽  
And Mathematics

AbstractIn the late 1940s and early 1950s, Lorenzen developed his operative logic and mathematics, a form of constructive mathematics. Nowadays this is mostly seen as a precursor of the better-known dialogical logic (Notable exceptions are the works of Schroeder-Heister 2008; Coquand and Neuwirth 2017; Kahle and Oitavem 2020.), and one might assume that the same philosophical motivations were present in both works. However, we want to show that this is not everywhere the case. In particular, we claim that Lorenzen’s well-known rejection of the actual infinite, as stated in Lorenzen (1957), was not a major motivation for operative logic and mathematics. Rather, we argue that a shift happened in Lorenzen’s treatment of the infinite from the early to the late 1950s. His early motivation for the development of operationism is concerned with a critique of the Cantorian notion of set and with related questions about the notions of countability and uncountability; it is only later that his motivation switches to focusing on the concept of infinity and the debate about actual and potential infinity.

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