International audienceMathematics is engendered in conjunction with other forms of knowledge, physics in particular. It is a “genealogy of concepts” (Riemann), that stems from our active reconstruction of the world. Mathematics organizes space and time. It stabilizes notions and concepts as no other language, while isolating by them a few intelligible fragments of “reality” at the phenomenal level. Thus an epistemological analysis of mathematics is proposed, as a foundation that departs from and complements the logico-formal approaches: Mathematics is grounded in a formation of sense, of a congnitive and historical nature, which preceeds the explicit formulation of axioms and rules. The genesis of some conceptual invariants will be sketched...
An Aristotelian Philosophy of Mathematics breaks the impasse between Platonist and nominalist views ...
Mathematics is generally considered as the only science where knowledge is uni form, universal, and...
The paper proposes to amend structuralism in mathematics by saying what places in a structure and th...
International audienceMathematics is engendered in conjunction with other forms of knowledge, physic...
International audienceMathematics stems out from our ways of making the world intelligible ...
Purpose – Categories (particular (P) and general (V)) constitute a bipole with epistemological impli...
The foundational analysis of mathematics has been strictly linked to, and often originated, philosop...
Mathematics stems out from our ways of making the world intelligible by its peculiar conceptual stab...
In what follows I argue for an epistemic bridge principle that allows us to move from real mathemati...
When dealing with the relationship between mathematics and cognition, we face two main intellectual ...
(1991), and elsewhere offers the most plausible philosophy of mathematics: Mathematics is about stru...
Abstract: The theory of embodied cognition proposes that the source of many ideas, including mathema...
Realists often suggest that scientific knowledge is grounded in the mathematical representation of n...
Summary: Our relation to phenomenal space has been largely disregarded, and with good motivations, i...
Primary object of interest of mathematicians can be identified as a „mathematical matter”, the conce...
An Aristotelian Philosophy of Mathematics breaks the impasse between Platonist and nominalist views ...
Mathematics is generally considered as the only science where knowledge is uni form, universal, and...
The paper proposes to amend structuralism in mathematics by saying what places in a structure and th...
International audienceMathematics is engendered in conjunction with other forms of knowledge, physic...
International audienceMathematics stems out from our ways of making the world intelligible ...
Purpose – Categories (particular (P) and general (V)) constitute a bipole with epistemological impli...
The foundational analysis of mathematics has been strictly linked to, and often originated, philosop...
Mathematics stems out from our ways of making the world intelligible by its peculiar conceptual stab...
In what follows I argue for an epistemic bridge principle that allows us to move from real mathemati...
When dealing with the relationship between mathematics and cognition, we face two main intellectual ...
(1991), and elsewhere offers the most plausible philosophy of mathematics: Mathematics is about stru...
Abstract: The theory of embodied cognition proposes that the source of many ideas, including mathema...
Realists often suggest that scientific knowledge is grounded in the mathematical representation of n...
Summary: Our relation to phenomenal space has been largely disregarded, and with good motivations, i...
Primary object of interest of mathematicians can be identified as a „mathematical matter”, the conce...
An Aristotelian Philosophy of Mathematics breaks the impasse between Platonist and nominalist views ...
Mathematics is generally considered as the only science where knowledge is uni form, universal, and...
The paper proposes to amend structuralism in mathematics by saying what places in a structure and th...