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  1. (1 other version)Kant und die Marburger Schule.Paul Natorp - 1912 - Société Française de Philosophie, Bulletin 17:193.
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  • The Price of Universality.Gabriel Uzquiano - 2006 - Philosophical Studies 129 (1):137-169.
    I present a puzzle for absolutely unrestricted quantification. One important advantage of absolutely unrestricted quantification is that it allows us to entertain perfectly general theories. Whereas most of our theories restrict attention to one or another parcel of reality, other theories are genuinely comprehensive taking absolutely all objects into their domain. The puzzle arises when we notice that absolutely unrestricted theories sometimes impose incompatible constraints on the size of the universe.
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  • An argument against an argument against the necessity of universal mereological composition.Duncan Watson - 2010 - Analysis 70 (1):78-82.
    (No abstract is available for this citation).
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  • What numbers could not be.Paul Benacerraf - 1965 - Philosophical Review 74 (1):47-73.
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  • An argument against the necessity of unrestricted composition.Einar Duenger Bohn - 2009 - Analysis 69 (1):27-31.
    Many metaphysicians accept the view that, necessarily, any collection of things composes some further thing. Necessarily, my arms, legs, head, and torso compose my body; necessarily, my arms, my heart, and the table compose something y; necessarily, my heart and the sun compose something z; and so on. 1 Though there have been a few recent attempts to argue against the necessity of this principle of unrestricted composition the consensus is that if it is true, it is necessarily true. 2In (...)
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  • Mathematics and reality.Stewart Shapiro - 1983 - Philosophy of Science 50 (4):523-548.
    The subject of this paper is the philosophical problem of accounting for the relationship between mathematics and non-mathematical reality. The first section, devoted to the importance of the problem, suggests that many of the reasons for engaging in philosophy at all make an account of the relationship between mathematics and reality a priority, not only in philosophy of mathematics and philosophy of science, but also in general epistemology/metaphysics. This is followed by a (rather brief) survey of the major, traditional philosophies (...)
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  • Mathematics as a science of patterns: Ontology and reference.Michael Resnik - 1981 - Noûs 15 (4):529-550.
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  • Mathematics as a science of patterns: Epistemology.Michael Resnik - 1982 - Noûs 16 (1):95-105.
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  • (1 other version)Kant und die Marburger Schule.Paul Natorp - 1912 - Kant Studien 17 (1-3):193-221.
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  • Must there be a top level?Einar Duenger Bohn - 2009 - Philosophical Quarterly 59 (235):193-201.
    I first explore the notion of the world's being such that everything in it is a proper part. I then explore the notion of the world's being such that everything in it both is and has a proper part. Given two well recognized assumptions, I argue that both notions represent genuine metaphysical possibilities. Finally I consider, but dismiss, some possible objections.
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  • On the significance of the Burali-Forti paradox.G. Hellman - 2011 - Analysis 71 (4):631-637.
    After briefly reviewing the standard set-theoretic resolutions of the Burali-Forti paradox, we examine how the paradox arises in set theory formalized with plural quantifiers. A significant choice emerges between the desirable unrestricted availability of ordinals to represent well-orderings and the sensibility of attempting to refer to ‘absolutely all ordinals’ or ‘absolutely all well-orderings’. This choice is obscured by standard set theories, which rely on type distinctions which are obliterated in the setting with plurals. Zermelo's attempt ( 1930 ) to secure (...)
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