The Mathematical Model of Smooth and Striated Spaces and the Connectivity Problem

Deleuze and Guatarri Studies 11 (3):328-355 (2017)
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Abstract

The mathematical model of smooth and striated spaces in Deleuze and Guattari's A Thousand Plateaus essentially rests on Riemann's manifold theory and Lautman's account of Riemannian spaces. In this paper I provide a detailed analysis of Lautman's account, arguing, however, that to discern its intricacies, and particularly what I shall call the connectivity problem, it is crucial to consider the fundamental work of Élie Cartan. This allows to address three key problems of Deleuze and Guattari's model: the heterogeneity and homogeneity of spaces, and the local/global duality; the connectivity of spaces and the intrinsic/extrinsic duality; and the translatability of spaces and their concrete mixes. As a result, Lautman's and Cartan's philosophical-mathematical questioning proves decisive to Deleuze and Guattari's appropriation of Riemann's theory, and thus the mathematical model of smooth and striated spaces.

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10.3366/dls.2017.0271

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Citations of this work

The Contiguity of the Continuum: A Kafkian Leibniz.Cristóbal Durán Rojas - 2024 - Deleuze and Guattari Studies 18 (1):60-80.

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References found in this work

Cinema 1: The Movement Image.Gilles Deleuze, Hugh Tomlinson & Barbara Habberjam - 1988 - Journal of Aesthetics and Art Criticism 46 (3):436-437.
Deleuze and the Mathematical Philosophy of Albert Lautman.Simon B. Duffy - 2009 - In Jon Roffe & Graham Jones (eds.), Deleuze’s Philosophical Lineage. Edinburgh University Press.

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