Switch to: References

Add citations

You must login to add citations.
  1. Mathematical Objectivity and Husserl’s “Community of Monads”.Noam Cohen - 2022 - Axiomathes 32 (3):971-991.
    This paper argues that the shared intersubjective accessibility of mathematical objects has its roots in a stratum of experience prior to language or any other form of concrete social interaction. On the basis of Husserl’s phenomenology, I demonstrate that intersubjectivity is an essential stratum of the objects of mathematical experience, i.e., an integral part of the peculiar sense of a mathematical object is its common accessibility to any consciousness whatsoever. For Husserl, any experience of an objective nature has as its (...)
    Download  
     
    Export citation  
     
    Bookmark  
  • (1 other version)Husserl’s Conception of Physical Theories and Physical Geometry in the Time of the Prolegomena: A Comparison with Duhem’s and Poincaré’s Views.Guillermo E. Rosado Haddock - 2012 - Global Philosophy 22 (1):171-193.
    This paper discusses Husserl’s views on physical theories in the first volume of his Logical Investigations, and compares them with those of his contemporaries Pierre Duhem and Henri Poincaré. Poincaré’s views serve as a bridge to a discussion of Husserl’s almost unknown views on physical geometry from about 1890 on, which in comparison even with Poincaré’s—not to say Frege’s—or almost any other philosopher of his time, represented a rupture with the philosophical tradition and were much more in tune with the (...)
    Download  
     
    Export citation  
     
    Bookmark  
  • (1 other version)Husserl’s Conception of Physical Theories and Physical Geometry in the Time of the Prolegomena: A Comparison with Duhem’s and Poincaré’s Views. [REVIEW]Guillermo E. Rosado Haddock - 2012 - Axiomathes 22 (1):171-193.
    This paper discusses Husserl’s views on physical theories in the first volume of his Logical Investigations , and compares them with those of his contemporaries Pierre Duhem and Henri Poincaré. Poincaré’s views serve as a bridge to a discussion of Husserl’s almost unknown views on physical geometry from about 1890 on, which in comparison even with Poincaré’s—not to say Frege’s—or almost any other philosopher of his time, represented a rupture with the philosophical tradition and were much more in tune with (...)
    Download  
     
    Export citation  
     
    Bookmark  
  • (1 other version)La notion husserlienne de multiplicité : au-delà de Cantor et Riemann.Carlo Ierna - 2012 - Methodos 12.
    The concept of a Mannigfaltigkeit in Husserl has been given various interpretations, due to its shifting role in his works. Many authors have been misled by this term, placing it in the context of Husserl’s early period in Halle, while writing the Philosophy of Arithmetic, as a friend and colleague of Georg Cantor.Yet at the time, Husserl distanced himself explicitly from Cantor’s definition and rather took Bernhard Riemann as example, having studied and lectured extensively on Riemann’s theories of space. Husserl’s (...)
    Download  
     
    Export citation  
     
    Bookmark   1 citation  
  • Husserl pour les philosophes analytiques.Guillermo E. Rosado Haddock - 2010 - Philosophiques 37 (2):325-348.
    There is a lot of misunderstanding and ignorance about Husserl’s philosophy among analytic philosophers. The present paper attempts to help correct that situation. It begins with some quotations of Husserl written around 1890, which clearly establish that he arrived at the distinction between sense and reference with independence from Frege. Then follows a brief survey of the most important themes of Husserl’s Logical Investigations, emphazising those that are of special interest to analytic philosophers. The paper concludes by mentioning other interesting (...)
    Download  
     
    Export citation  
     
    Bookmark