Bolzano’s Mathematical Infinite

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Review of Symbolic Logic:1-55 (2021)
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Abstract

Bernard Bolzano (1781–1848) is commonly thought to have attempted to develop a theory of size for infinite collections that follows the so-called part–whole principle, according to which the whole is always greater than any of its proper parts. In this paper, we develop a novel interpretation of Bolzano’s mature theory of the infinite and show that, contrary to mainstream interpretations, it is best understood as a theory of infinite sums. Our formal results show that Bolzano’s infinite sums can be equipped with the rich and original structure of a non-commutative ordered ring, and that Bolzano’s views on the mathematical infinite are, after all, consistent.

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10.1017/s1755020321000010

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Author Profiles

Anna Bellomo
University of Vienna
Guillaume Massas
University of California, Berkeley

Citations of this work

Sizes of Countable Sets.Kateřina Trlifajová - 2024 - Philosophia Mathematica 32 (1):82-114.

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References found in this work

Model theory.Wilfrid Hodges - 2008 - Stanford Encyclopedia of Philosophy.
Cantorian Set Theory and Limitation of Size.Michael Hallett - 1984 - Oxford, England: Clarendon Press.
Wissenschaftslehre.Bernard Bolzano & Alois Höfler - 1837 - Revue de Métaphysique et de Morale 22 (4):15-16.

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