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Concepts and intuitions in Kant's philosophy of geometry
Kant Studien 97 (2):138-162 (2006)
Abstract
This paper is an exposition and defense of Kant’s philosophy of geometry. The main thesis is that Euclidean geometry investigates the properties of geometrical objects in an inner space that is given to us a priori (pure space) and hence is a priori and synthetic. This thesis is supported by arguing that Euclidean geometry requires certain intuitive objects (Sect. 1), that these objects are a priori constructions in pure space (Sect. 2), and finally that the role of geometrical construction is to provide geometrical objects, not concepts, as some have claimed (Sect. 3).Author's Profile
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Citations of this work
Kant and Strawson on the Content of Geometrical Concepts.Katherine Dunlop - 2012 - Noûs 46 (1):86-126.
Two Models of Kantian Construction.Aljoša Kravanja - 2023 - Journal of Transcendental Philosophy 4 (2):137-155.
Kant on Construction, Apriority, and the Moral Relevance of Universalization.Timothy Rosenkoetter - 2011 - British Journal for the History of Philosophy 19 (6):1143-1174.
Kant's A Priori Intuition of Space Independent of Postulates.Edgar J. Valdez - 2012 - Kantian Review 17 (1):135-160.
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