•  5
    Concepts of Time and Space in Phenomenology
    Naharaim 1 (2): 240-259. 2007.
    I Ricœur's account of the distinction between phenomenological and cosmological time My theme concerns the notions of time and space in Ricœur's thought with special emphasis on its relation to Phenomenology. As I understand it, in Temps et récit and again in La mémoire, l'histoire, l'oubli Ricœur proposes an opposition between subjective/phenomenological time and objective/cosmological time. In La mémoire, l'histoire, l'oubli he introduces a parallel distinction between lived space and geometri…Read more
  •  22
    Husserl and Mathematics (review)
    History and Philosophy of Logic 43 (4): 396-398. 2022.
    After a period in which the relation between mathematics and phenomenology was little researched, and sometimes assumed to be antagonistic, in recent decades the place of mathematics in Husserl’s t...
  •  4
    Cosmological and Psychological Time (edited book)
    Springer. 2015.
    This book examines the many faces of philosophy of time, including the metaphysical aspects, natural science issues, and the consciousness of time. It brings together the different methodologies of investigating the philosophy of time. It does so to counter the growing fragmentation of the field with regard to discussions, and the existing cleavage between analytic and continental traditions in philosophy. The book’s multidirectional approach to the notion of time contributes to a better underst…Read more
  •  10
    Mathesis Universalis and Husserl’s Phenomenology
    Axiomathes 32 (4): 627-637. 2022.
    The paper’s central theme is the link between phenomenology and the notion of the mathesis universalis, a link articulated by Husserl in the third volume of the Ideas: “My way to phenomenology was essentially determined by the mathesis universalis.” The paper suggests three interpretations of the phenomenology—mathesis universalis nexus: the first is related to the development of Husserl’s conception of the foundations of arithmetic; the second is based on the role of the theory of manifolds in …Read more
  •  117
    A Parting of the Ways: Carnap, Cassirer, and Heidegger (review)
    Philosophical Review 111 (1): 119. 2002.
    The divide between the analytic and the continental philosophical traditions has been a major preoccupation of philosophers and historians of philosophy in the past few decades. Many attempts have been made to bridge the gap between the two traditions. Appel, Rorty, Cavell, and others, for example, have drawn to our attention profound affinities between Wittgenstein and Heidegger. But until now, it has nonetheless seemed that the divide remained firmly entrenched with respect to the thought of H…Read more
  •  130
    Derrida and Cavaillès: Mathematics and the Limits of Phenomenology
    International Journal of Philosophical Studies 18 (2): 243-254. 2010.
    This paper examines Derrida's interpretation of Jean Cavaill s's critique of phenomenology in On Logic and the Theory of Science . Derrida's main claim is that Cavaill s's arguments, especially the argument based on G del's incompleteness theorems, need not lead to a total rejection of Husserl's phenomenology, but only its static version. Genetic phenomenology, on the other hand, not only is not undermined by Cavaill s's critique, but can even serve as a philosophical framework for Cavaill s's o…Read more
  •  29
    Heidegger, Science, and the Mathematical Age
    Science in Context 10 (1): 199-206. 1997.
    The ArgumentThe purpose of this article is to read Heidegger's critique of modern science —especially in What Is a Thing? —as evolving from ontological issues that preoccupied Heidegger in the period after the publication of Being and Time. The main issues at stake are formal ontology and its connection with mathematics and modern mathematical physics, and the distinction between formal and regional ontology. The connection between these issues constitutes Heidegger's understanding of mathematic…Read more
  •  7
    One as transcendental and one as number -- Number and time in Being and time -- The mathematical epoch -- Conclusion : toward a continental philosophy of mathematics.
  •  39
    Meaning, phenomenology, and being
    Inquiry: An Interdisciplinary Journal of Philosophy 47 (2). 2004.
    This Article does not have an abstract
  •  30
    (2005). Being and Time and Brouwer's Intuitionism. Angelaki: Vol. 10, continental philosophy and the sciences the german traditionissue editor: damian veal, pp. 181-186