MATHEMATICAL SPACES AND KANTIAN SPACE AS FORMS OF “DE PURE INTUITION” Cover Image

ESPACES MATHÉMATIQUES ET L’ESPACE KANTIEN EN TANT QUE FORME DE L’INTUITION PURE
MATHEMATICAL SPACES AND KANTIAN SPACE AS FORMS OF “DE PURE INTUITION”

Author(s): Marcel Bodea
Subject(s): Philosophy
Published by: Studia Universitatis Babes-Bolyai

Summary/Abstract: Mathematical Spaces and Kantian space as forms of “de pure intuition”. Kant has proposed that: space is a “form of intuition” for objects in experience. Kant’s point is that it is impossible for us to have any experience of objects that are not represented in a tri-dimensional space. Under the intuition of connection we have constructed in this text a topological argument for Kant’s claim

  • Issue Year: 49/2004
  • Issue No: 1-2
  • Page Range: 33-42
  • Page Count: 10
  • Language: French
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