Exploring the Deduction of the Category of Totality from within the Analytic of the Sublime

  • Array Array Ghent University
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Keywords: The mathematical sublime, totality, category, object, singularity

Abstract

I defend an interpretation of the first Critique’s category of totality based on Kant’s analysis of totality in the third Critique’s Analytic of the mathematical sublime. I show, firstly, that in the latter Kant delineates the category of totality — however general it may be — in relation to the essentially singular standpoint of the subject. Despite the fact that sublime and categorial totality have a significantly different scope and function, they do share such a singular baseline. Secondly, I argue that Kant’s note (in the first Critique’s metaphysical deduction) that deriving the category of totality requires a special act of the understanding can be seen as a ‘mark’ of that singular baseline. This way, my aesthetical ‘detour’ has the potential of revealing how itself.

Author Biography

Array Array, Ghent University

PhD Researcher at Ghent University as a fellow of the FWO Flanders. E-mail: levi.haeck@ugent.be

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Published
2020-12-10
Section
Número monográfico «La teoría estética de Kant» / Special Issue «Kant’s Aestheti