Add to ORKGBernard 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
The infinite in mathematics has two manifestations. Its occurrence in analysis has been satisfactori...
We apply Benacerraf’s distinction between mathematical ontology and mathematical practice (or the st...
Wilhelm Ackermann has proved that Zermelo-Fraenkel set theory in which the axiom of infinity is repl...
Bernard Bolzano (1781-1848) is commonly thought to have attempted to develop a theory of size for in...
This dissertation is a collection of essays almost exclusively focussing on Bernard Bolzano's theory...
For many centuries the predominant opinion of philosophers and mathematicians was that infinite is...
The aim of the paper is to remove the ambiguities contained in the 20th Section Bernard Bolzano's 'P...
"The study of the history of mathematics 2016". August 29~September 1, 2016. edited by Shigeru Jochi...
This paper surveys Bolzano's Beyträge zu einer begründeteren Darstellung der Mathematik (Contributio...
The paper discusses some changes in Bolzano's definition of mathematics attested in several quotatio...
I address the historical emergence of the mathematical infinite, and how we are to take the infinite...
The {\it technique} of classical mathematics involves only potential infinity, i.e. infinity is unde...
Bernard Bolzano (1781 – 1848) was a Bohemian polymath who made important contributions in philosophy...
Este artículo da cuenta de la aparición histórica de lo infinito en la teoría de conjuntos, y de cóm...
This dissertation is a conceptual history of transfinite set theory from the earliest results until ...
The infinite in mathematics has two manifestations. Its occurrence in analysis has been satisfactori...
We apply Benacerraf’s distinction between mathematical ontology and mathematical practice (or the st...
Wilhelm Ackermann has proved that Zermelo-Fraenkel set theory in which the axiom of infinity is repl...
Bernard Bolzano (1781-1848) is commonly thought to have attempted to develop a theory of size for in...
This dissertation is a collection of essays almost exclusively focussing on Bernard Bolzano's theory...
For many centuries the predominant opinion of philosophers and mathematicians was that infinite is...
The aim of the paper is to remove the ambiguities contained in the 20th Section Bernard Bolzano's 'P...
"The study of the history of mathematics 2016". August 29~September 1, 2016. edited by Shigeru Jochi...
This paper surveys Bolzano's Beyträge zu einer begründeteren Darstellung der Mathematik (Contributio...
The paper discusses some changes in Bolzano's definition of mathematics attested in several quotatio...
I address the historical emergence of the mathematical infinite, and how we are to take the infinite...
The {\it technique} of classical mathematics involves only potential infinity, i.e. infinity is unde...
Bernard Bolzano (1781 – 1848) was a Bohemian polymath who made important contributions in philosophy...
Este artículo da cuenta de la aparición histórica de lo infinito en la teoría de conjuntos, y de cóm...
This dissertation is a conceptual history of transfinite set theory from the earliest results until ...
The infinite in mathematics has two manifestations. Its occurrence in analysis has been satisfactori...
We apply Benacerraf’s distinction between mathematical ontology and mathematical practice (or the st...
Wilhelm Ackermann has proved that Zermelo-Fraenkel set theory in which the axiom of infinity is repl...