•  101
    J. J. Katz, realistic rationalism (review)
    Erkenntnis 52 (3): 419-423. 2000.
  •  120
    Albert Lautman, philosophe des mathématiques
    Philosophiques 37 (1): 3-7. 2010.
  •  2517
    The History of Categorical Logic: 1963-1977
    In Dov M. Gabbay, John Woods & Akihiro Kanamori (eds.), Handbook of the history of logic, Elsevier. 2004.
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    Category theory
    Stanford Encyclopedia of Philosophy. 2008.
  •  525
    Categories in context: Historical, foundational, and philosophical
    Philosophia Mathematica 13 (1): 1-43. 2005.
    The aim of this paper is to put into context the historical, foundational and philosophical significance of category theory. We use our historical investigation to inform the various category-theoretic foundational debates and to point to some common elements found among those who advocate adopting a foundational stance. We then use these elements to argue for the philosophical position that category theory provides a framework for an algebraic in re interpretation of mathematical structuralism.…Read more
  •  211
    Some concepts that are now part and parcel of mathematics used to be, at least until the beginning of the twentieth century, a central preoccupation of mathematicians and philosophers. The concept of continuity, or the continuous, is one of them. Nowadays, many philosophers of mathematics take it for granted that mathematicians of the last quarter of the nineteenth century found an adequate conceptual analysis of the continuous in terms of limits and that serious philosophical thinking is no lon…Read more
  •  1243
    Abstract mathematical tools and machines for mathematics
    Philosophia Mathematica 5 (3): 250-272. 1997.
    In this paper, we try to establish that some mathematical theories, like K-theory, homology, cohomology, homotopy theories, spectral sequences, modern Galois theory (in its various applications), representation theory and character theory, etc., should be thought of as (abstract) machines in the same way that there are (concrete) machines in the natural sciences. If this is correct, then many epistemological and ontological issues in the philosophy of mathematics are seen in a different light. W…Read more
  •  181
    Menger and Nöbeling on Pointless Topology
    with Mathieu Bélanger
    Logic and Logical Philosophy 22 (2): 145-165. 2013.
    This paper looks at how the idea of pointless topology itself evolved during its pre-localic phase by analyzing the definitions of the concept of topological space of Menger and Nöbeling. Menger put forward a topology of lumps in order to generalize the definition of the real line. As to Nöbeling, he developed an abstract theory of posets so that a topological space becomes a particular case of topological poset. The analysis emphasizes two points. First, Menger's geometrical perspective was sup…Read more
  •  1
    Towards a Theory of Partial Truth
    Dissertation, Mcgill University (Canada). 1988.
    The nature of truth has occupied philosophers since the very beginning of the field. Our goal is to clarify the notion of scientific truth, in particular the notion of partial truth of facts. Our strategy consists to brake the problem into smaller, more manageable, questions. Thus, we distinguish the truth of a scientific theory, what we call the "global" truth value of a theory, from the truth of a particular scientific proposition, what we call the "local" truth values of a theory. We will pre…Read more
  •  1797
    The aim of this paper is to clarify the role of category theory in the foundations of mathematics. There is a good deal of confusion surrounding this issue. A standard philosophical strategy in the face of a situation of this kind is to draw various distinctions and in this way show that the confusion rests on divergent conceptions of what the foundations of mathematics ought to be. This is the strategy adopted in the present paper. It is divided into 5 sections. We first show that already in th…Read more
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    Approximations and truth spaces
    Journal of Philosophical Logic 20 (4). 1991.
    Approximations form an essential part of scientific activity and they come in different forms: conceptual approximations (simplifications in models), mathematical approximations of various types (e.g. linear equations instead of non-linear ones, computational approximations), experimental approximations due to limitations of the instruments and so on and so forth. In this paper, we will consider one type of approximation, namely numerical approximations involved in the comparison of two results,…Read more
  •  158
    A Study of the History and Philosophy of Category Theory Jean-Pierre Marquis. to say that objects are dispensable in geometry. What is claimed is that the specific nature of the objects used is irrelevant. To use the terminology already ...
  •  191
    Mathematical Conceptware: Category Theory: Critical Studies/Book Reviews
    Philosophia Mathematica 18 (2): 235-246. 2010.
    (No abstract is available for this citation)
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    Critical Notice
    Canadian Journal of Philosophy 30 (1): 161-178. 2000.
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    A path to the epistemology of mathematics: homotopy theory
    In José Ferreirós Domínguez & Jeremy Gray (eds.), The Architecture of Modern Mathematics: Essays in History and Philosophy, Oxford University Press. pp. 239--260. 2006.