In line with the latest positions of Gottlob Frege, this article puts forward the hypoth- esis that the cognitive bases of mathematics are geometric in nature. Starting from the geometry axioms of the Elements of Euclid, we introduce a geometric theory of propor- tions along the lines of the one introduced by Grassmann in Ausdehnungslehre in 1844. Assuming as axioms, the cognitive contents of the theorems of Pappus and Desargues, through their configurations, in an Euclidean plane a natural field structure can be iden- tified that reveals the purely geometric nature of complex numbers. Reasoning based on figures is becoming a growing interdisciplinary field in logic, philosophy and cognitive sciences, and is also of considerable interest in...
Perception has structure. Aspects of this structure are relevant for image-based geometrical objects...
I investigate the role of geometric intuition in Frege’s early mathemat- ical works and the signific...
Mathematics stems out from our ways of making the world intelligible by its peculiar conceptual stab...
n line with the latest positions of Gottlob Frege, this article puts forward the hypothesis that the...
Frege writes in Numbers and Arithmetic about kindergarten-numbers and “an a priori mode of cognition...
Frege writes in Numbers and Arithmetic about kindergarten-numbers and “an a priori mode of cognition...
In this text we will focus on some "geometric" judgements, which ground proofs and concepts of mathe...
Ever since the very beginning of ancient philosophy, from Pythagoras to Plato, we know that the worl...
How does the human brain support abstract concepts such as seven or square? Studies of non-human ani...
We give a brief overview of the evolution of mathematics, starting from antiquity, through ...
Frege with Grundlagen der Arithmetik and Hilbert with Grundlagen der Geometrie are two outstanding f...
Abstract: The theory of embodied cognition proposes that the source of many ideas, including mathema...
The idea that formal geometry derives from intuitive notions of space has appeared in many guises, m...
Unpublished manuscriptGeometry is a school subject, but also and primarily geometry is a mathematica...
This review discusses the content of Mateusz Hohol’s new book Foundations of Geometric Cognition. Ma...
Perception has structure. Aspects of this structure are relevant for image-based geometrical objects...
I investigate the role of geometric intuition in Frege’s early mathemat- ical works and the signific...
Mathematics stems out from our ways of making the world intelligible by its peculiar conceptual stab...
n line with the latest positions of Gottlob Frege, this article puts forward the hypothesis that the...
Frege writes in Numbers and Arithmetic about kindergarten-numbers and “an a priori mode of cognition...
Frege writes in Numbers and Arithmetic about kindergarten-numbers and “an a priori mode of cognition...
In this text we will focus on some "geometric" judgements, which ground proofs and concepts of mathe...
Ever since the very beginning of ancient philosophy, from Pythagoras to Plato, we know that the worl...
How does the human brain support abstract concepts such as seven or square? Studies of non-human ani...
We give a brief overview of the evolution of mathematics, starting from antiquity, through ...
Frege with Grundlagen der Arithmetik and Hilbert with Grundlagen der Geometrie are two outstanding f...
Abstract: The theory of embodied cognition proposes that the source of many ideas, including mathema...
The idea that formal geometry derives from intuitive notions of space has appeared in many guises, m...
Unpublished manuscriptGeometry is a school subject, but also and primarily geometry is a mathematica...
This review discusses the content of Mateusz Hohol’s new book Foundations of Geometric Cognition. Ma...
Perception has structure. Aspects of this structure are relevant for image-based geometrical objects...
I investigate the role of geometric intuition in Frege’s early mathemat- ical works and the signific...
Mathematics stems out from our ways of making the world intelligible by its peculiar conceptual stab...