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  1. On a certain fallacy concerning I-am-unprovable sentences.Kaave Lajevardi & Saeed Salehi - manuscript
    We demonstrate that, in itself and in the absence of extra premises, the following argument scheme is fallacious: The sentence A says about itself that it has a property F, and A does in fact have the property F; therefore A is true. We then examine an argument of this form in the informal introduction of Gödel’s classic (1931) and examine some auxiliary premises which might have been at work in that context. Philosophically significant as it may be, that particular (...)
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  • There May Be Many Arithmetical Gödel Sentences.Kaave Lajevardi & Saeed Salehi - 2021 - Philosophia Mathematica 29 (2):278–287.
    We argue that, under the usual assumptions for sufficiently strong arithmetical theories that are subject to Gödel’s First Incompleteness Theorem, one cannot, without impropriety, talk about *the* Gödel sentence of the theory. The reason is that, without violating the requirements of Gödel’s theorem, there could be a true sentence and a false one each of which is provably equivalent to its own unprovability in the theory if the theory is unsound.
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  • Cognitive mapping and algorithmic complexity: Is there a role for quantum processes in the evolution of human consciousness?Ron Wallace - 1993 - Behavioral and Brain Sciences 16 (3):614-615.
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  • On the philosophical relevance of Gödel's incompleteness theorems.Panu Raatikainen - 2005 - Revue Internationale de Philosophie 59 (4):513-534.
    A survey of more philosophical applications of Gödel's incompleteness results.
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  • On the Arithmetical Truth of Self‐Referential Sentences.Kaave Lajevardi & Saeed Salehi - 2019 - Theoria 85 (1):8-17.
    We take an argument of Gödel's from his ground‐breaking 1931 paper, generalize it, and examine its validity. The argument in question is this: "the sentence G says about itself that it is not provable, and G is indeed not provable; therefore, G is true".
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  • How subtle is Gödel's theorem? More on Roger Penrose.Martin Davis - 1993 - Behavioral and Brain Sciences 16 (3):611-612.
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  • A Metasemantic Challenge for Mathematical Determinacy.Jared Warren & Daniel Waxman - 2020 - Synthese 197 (2):477-495.
    This paper investigates the determinacy of mathematics. We begin by clarifying how we are understanding the notion of determinacy before turning to the questions of whether and how famous independence results bear on issues of determinacy in mathematics. From there, we pose a metasemantic challenge for those who believe that mathematical language is determinate, motivate two important constraints on attempts to meet our challenge, and then use these constraints to develop an argument against determinacy and discuss a particularly popular approach (...)
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  • Yesterday’s Algorithm: Penrose and the Gödel Argument.William Seager - 2003 - Croatian Journal of Philosophy 3 (9):265-273.
    Roger Penrose is justly famous for his work in physics and mathematics but he is _notorious_ for his endorsement of the Gödel argument (see his 1989, 1994, 1997). This argument, first advanced by J. R. Lucas (in 1961), attempts to show that Gödel’s (first) incompleteness theorem can be seen to reveal that the human mind transcends all algorithmic models of it1. Penrose's version of the argument has been seen to fall victim to the original objections raised against Lucas (see Boolos (...)
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  • Conservative deflationism?Julien Murzi & Lorenzo Rossi - 2020 - Philosophical Studies 177 (2):535-549.
    Deflationists argue that ‘true’ is merely a logico-linguistic device for expressing blind ascriptions and infinite generalisations. For this reason, some authors have argued that deflationary truth must be conservative, i.e. that a deflationary theory of truth for a theory S must not entail sentences in S’s language that are not already entailed by S. However, it has been forcefully argued that any adequate theory of truth for S must be non-conservative and that, for this reason, truth cannot be deflationary :493–521, (...)
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  • Mind the truth: Penrose's new step in the Gödelian argument.Salvatore Guccione - 1993 - Behavioral and Brain Sciences 16 (3):612-613.
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  • An emperor still without mind.Roger Penrose - 1993 - Behavioral and Brain Sciences 16 (3):616-622.
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  • On the necessary philosophical premises of the Goedelian arguments.Fano Vincenzo & Graziani Pierluigi - unknown
    Lucas-Penrose type arguments have been the focus of many papers in the literature. In the present paper we attempt to evaluate the consequences of Gödel’s incompleteness theorems for the philosophy of the mind. We argue that the best answer to this question was given by Gödel already in 1951 when he realized that either our intellectual capability is not representable by a Turing Machine, or we can never know with mathematical certainty what such a machine is. But his considerations became (...)
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  • Why Godel's theorem cannot refute computationalism: A reply to Penrose.Geoffrey LaForte, Patrick J. Hayes & Kenneth M. Ford - 1998 - Artificial Intelligence 104 (1-2):265-286.
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  • Quantum theory and consciousness.David L. Wilson - 1993 - Behavioral and Brain Sciences 16 (3):615-616.
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  • The incompleteness of quantum physics.Euan J. Squires - 1993 - Behavioral and Brain Sciences 16 (3):613-614.
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