Publication details
Year: 2019
Pages: 473-500
Series: Meta: Research in Hermeneutics, Phenomenology, and Practical Philosophy
Full citation:
, "From Grassmann, Riemann to Husserl", Meta: Research in Hermeneutics, Phenomenology, and Practical Philosophy 11 (2), 2019, pp. 473-500.
From Grassmann, Riemann to Husserl
a brief history of the concept of manifold
pp. 473-500
in: Iulian Apostolescu (ed), After Husserl, Meta: Research in Hermeneutics, Phenomenology, and Practical Philosophy 11 (2), 2019.Abstract
Edmund Husserl’s theory of manifold (Mannigfaltigkeitslehre) was formalized for the first time in his Philosophie der Arithmetik; in his Logische Untersuchungen, §§69–70; also discussed in Ideen I, §§72; in Formale und Trascendentale Logik, §§51–54; in Logik und allgemeine Wissenschaftstheorie, chapter two; and finally it appears in Einleitung in die Logik und Erkenntnistheorie, §§18–19. In each of these books, Husserl presents a concept of manifolds as an ontological form. Such form is necessarily axiomatic and appears as inspired by Bernhard Riemann’s work. Indeed, Husserl, who studied and lectured extensively on Riemann’s theories of space, presented his own conception of mathematics as a theory of manifolds as a generalization of Riemann’s notion of manifold.
Cited authors
Publication details
Year: 2019
Pages: 473-500
Series: Meta: Research in Hermeneutics, Phenomenology, and Practical Philosophy
Full citation:
, "From Grassmann, Riemann to Husserl", Meta: Research in Hermeneutics, Phenomenology, and Practical Philosophy 11 (2), 2019, pp. 473-500.