Results for 'Finite Knowledge'

960 found
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  1. Ultimate-Grounding Under the Condition of Finite Knowledge. A Hegelian Perspective.Dieter Wandschneider - 2005 - In Wolf-Jürgen Cramm, Wulf Kellerwessel, David Krause & Hans-Christoph Kupfer (eds.), Diskurs und Reflexion. Wolfgang Kuhlmann zum 65. Geburtstag. Königshausen & Neumann. pp. 353–372.
    Hegel's Science of Logic makes the just not low claim to be an absolute, ultimate-grounded knowledge. This project, which could not be more ambitious, has no good press in our post-metaphysical age. However: That absolute knowledge absolutely cannot exist, cannot be claimed without self-contradiction. On the other hand, there can be no doubt about the fundamental finiteness of knowledge. But can absolute knowledge be finite knowledge? This leads to the problem of a self-explication of (...)
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  2. Group Knowledge and Mathematical Collaboration: A Philosophical Examination of the Classification of Finite Simple Groups.Joshua Habgood-Coote & Fenner Stanley Tanswell - 2023 - Episteme 20 (2):281-307.
    In this paper we apply social epistemology to mathematical proofs and their role in mathematical knowledge. The most famous modern collaborative mathematical proof effort is the Classification of Finite Simple Groups. The history and sociology of this proof have been well-documented by Alma Steingart (2012), who highlights a number of surprising and unusual features of this collaborative endeavour that set it apart from smaller-scale pieces of mathematics. These features raise a number of interesting philosophical issues, but have received (...)
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  3. Understanding 'Practical Knowledge'.John Schwenkler - 2015 - Philosophers' Imprint 15.
    The concept of practical knowledge is central to G.E.M. Anscombe's argument in Intention, yet its meaning is little understood. There are several reasons for this, including a lack of attention to Anscombe's ancient and medieval sources for the concept, and an emphasis on the more straightforward concept of knowledge "without observation" in the interpretation of Anscombe's position. This paper remedies the situation, first by appealing to the writings of Thomas Aquinas to develop an account of practical knowledge (...)
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  4. Knowledge Beyond Reason in Spinoza’s Epistemology: Scientia Intuitiva and Amor Dei Intellectualis in Spinoza’s Epistemology.Anne Newstead - 2020 - Australasian Philosophical Review 4 (Revisiting Spinoza's Rationalism).
    Genevieve Lloyd’s Spinoza is quite a different thinker from the arch rationalist caricature of some undergraduate philosophy courses devoted to “The Continental Rationalists”. Lloyd’s Spinoza does not see reason as a complete source of knowledge, nor is deductive rational thought productive of the highest grade of knowledge. Instead, that honour goes to a third kind of knowledge—intuitive knowledge (scientia intuitiva), which provides an immediate, non-discursive knowledge of its singular object. To the embarrassment of some hard-nosed (...)
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  5. Elimination of Cuts in First-order Finite-valued Logics.Matthias Baaz, Christian G. Fermüller & Richard Zach - 1993 - Journal of Information Processing and Cybernetics EIK 29 (6):333-355.
    A uniform construction for sequent calculi for finite-valued first-order logics with distribution quantifiers is exhibited. Completeness, cut-elimination and midsequent theorems are established. As an application, an analog of Herbrand’s theorem for the four-valued knowledge-representation logic of Belnap and Ginsberg is presented. It is indicated how this theorem can be used for reasoning about knowledge bases with incomplete and inconsistent information.
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  6. Spinoza on negation, mind-dependence and the reality of the finite.Karolina Hübner - 2015 - In Yitzhak Y. Melamed (ed.), The Young Spinoza: A Metaphysician in the Making. New York: Oxford University Press. pp. 221-37.
    The article explores the idea that according to Spinoza finite thought and substantial thought represent reality in different ways. It challenges “acosmic” readings of Spinoza's metaphysics, put forth by readers like Hegel, according to which only an infinite, undifferentiated substance genuinely exists, and all representations of finite things are illusory. Such representations essentially involve negation with respect to a more general kind. The article shows that several common responses to the charge of acosmism fail. It then argues that (...)
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  7. "Infinity, Knowledge, and Divinity in the Thought of Cusanus and Cantor" (Manuscript draft of first page of forthcoming book chapter ).Anne Newstead (ed.) - forthcoming - Berlin: De Gruyter.
    Renaissance philosopher, mathematician, and theologian Nicholas of Cusa (1401-1464) said that there is no proportion between the finite mind and the infinite. He is fond of saying reason cannot fully comprehend the infinite. That our best hope for attaining a vision and understanding of infinite things is by mathematics and by the use of contemplating symbols, which help us grasp "the absolute infinite". By the late 19th century, there is a decisive intervention in mathematics and its philosophy: the philosophical (...)
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  8. Absolute Infinity, Knowledge, and Divinity in the Thought of Cusanus and Cantor (ABSTRACT ONLY).Anne Newstead - 2024 - In Mirosław Szatkowski (ed.), Ontology of Divinity. Boston: De Gruyter. pp. 561-580.
    Renaissance philosopher, mathematician, and theologian Nicholas of Cusa (1401-1464) said that there is no proportion between the finite mind and the infinite. He is fond of saying reason cannot fully comprehend the infinite. That our best hope for attaining a vision and understanding of infinite things is by mathematics and by the use of contemplating symbols, which help us grasp "the absolute infinite". By the late 19th century, there is a decisive intervention in mathematics and its philosophy: the philosophical (...)
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  9. Leibniz on Knowledge and God.Christia Mercer - 2002 - American Catholic Philosophical Quarterly 76 (4):531-550.
    Scholars have long noted that, for Leibniz, the attributes or Ideas of God are the ultimate objects of human knowledge. In this paper, I go beyond these discussions to analyze Leibniz’s views about the nature and limitations of such knowledge. As with so many other aspects of his thought, Leibniz’s position on this issue—what I will call his divine epistemology—is both radical and conservative. It is also not what we might expect, given other tenets of his system. For (...)
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  10.  54
    A Theory of Knowledge.Thomas A. Roll - 2024 - Dissertation, University of Cincinnati
    A short dissertation on a definition for knowledge. Although similar to binary opposition, this treatise follows the logic to conclude that knowledge is finite.
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  11. Statements and open problems on decidable sets X⊆N that contain informal notions and refer to the current knowledge on X.Apoloniusz Tyszka - 2022 - Journal of Applied Computer Science and Mathematics 16 (2):31-35.
    Let f(1)=2, f(2)=4, and let f(n+1)=f(n)! for every integer n≥2. Edmund Landau's conjecture states that the set P(n^2+1) of primes of the form n^2+1 is infinite. Landau's conjecture implies the following unproven statement Φ: card(P(n^2+1))<ω ⇒ P(n^2+1)⊆[2,f(7)]. Let B denote the system of equations: {x_j!=x_k: i,k∈{1,...,9}}∪{x_i⋅x_j=x_k: i,j,k∈{1,...,9}}. The system of equations {x_1!=x_1, x_1 \cdot x_1=x_2, x_2!=x_3, x_3!=x_4, x_4!=x_5, x_5!=x_6, x_6!=x_7, x_7!=x_8, x_8!=x_9} has exactly two solutions in positive integers x_1,...,x_9, namely (1,...,1) and (f(1),...,f(9)). No known system S⊆B with a (...) number of solutions in positive integers x_1,...,x_9 has a solution (x_1,...,x_9)∈(N\{0})^9 satisfying max(x_1,...,x_9)>f(9). For every known system S⊆B, if the finiteness/infiniteness of the set {(x_1,...,x_9)∈(N\{0})^9: (x_1,...,x_9) solves S} is unknown, then the statement ∃ x_1,...,x_9∈N\{0} ((x_1,...,x_9) solves S)∧(max(x_1,...,x_9)>f(9)) remains unproven. Let Λ denote the statement: if the system of equations {x_2!=x_3, x_3!=x_4, x_5!=x_6, x_8!=x_9, x_1 \cdot x_1=x_2, x_3 \cdot x_5=x_6, x_4 \cdot x_8=x_9, x_5 \cdot x_7=x_8} has at most finitely many solutions in positive integers x_1,...,x_9, then each such solution (x_1,...,x_9) satisfies x_1,...,x_9≤f(9). The statement Λ is equivalent to the statement Φ. It heuristically justifies the statement Φ . This justification does not yield the finiteness/infiniteness of P(n^2+1). We present a new heuristic argument for the infiniteness of P(n^2+1), which is not based on the statement Φ. Algorithms always terminate. We explain the distinction between existing algorithms (i.e. algorithms whose existence is provable in ZFC) and known algorithms (i.e. algorithms whose definition is constructive and currently known). Assuming that the infiniteness of a set X⊆N is false or unproven, we define which elements of X are classified as known. No known set X⊆N satisfies Conditions (1)-(4) and is widely known in number theory or naturally defined, where this term has only informal meaning. *** (1) A known algorithm with no input returns an integer n satisfying card(X)<ω ⇒ X⊆(-∞,n]. (2) A known algorithm for every k∈N decides whether or not k∈X. (3) No known algorithm with no input returns the logical value of the statement card(X)=ω. (4) There are many elements of X and it is conjectured, though so far unproven, that X is infinite. (5) X is naturally defined. The infiniteness of X is false or unproven. X has the simplest definition among known sets Y⊆N with the same set of known elements. *** Conditions (2)-(5) hold for X=P(n^2+1). The statement Φ implies Condition (1) for X=P(n^2+1). The set X={n∈N: the interval [-1,n] contains more than 29.5+\frac{11!}{3n+1}⋅sin(n) primes of the form k!+1} satisfies Conditions (1)-(5) except the requirement that X is naturally defined. 501893∈X. Condition (1) holds with n=501893. card(X∩[0,501893])=159827. X∩[501894,∞)= {n∈N: the interval [-1,n] contains at least 30 primes of the form k!+1}. We present a table that shows satisfiable conjunctions of the form #(Condition 1) ∧ (Condition 2) ∧ #(Condition 3) ∧ (Condition 4) ∧ #(Condition 5), where # denotes the negation ¬ or the absence of any symbol. No set X⊆N will satisfy Conditions (1)-(4) forever, if for every algorithm with no input, at some future day, a computer will be able to execute this algorithm in 1 second or less. The physical limits of computation disprove this assumption. (shrink)
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  12. Saving epistemology from the epistemologists: recent work in the theory of knowledge.Adam Morton - 2000 - British Journal for the Philosophy of Science 51 (4):685-704.
    This is a very selective survey of developments in epistemology, concentrating on work from the past twenty years that is of interest to philosophers of science. The selection is organized around interesting connections between distinct themes. I first connect issues about skepticism to issues about the reliability of belief-acquiring processes. Next I connect discussions of the defeasibility of reasons for belief to accounts of the theory-independence of evidence. Then I connect doubts about Bayesian epistemology to issues about the content of (...)
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  13.  41
    Rifiuto del finito, dell’articolazione dei saperi e della diversità.Angelo Campodonico - 2015 - In Gabriele De Anna & Emanuele Samek Lodovici (eds.), L'origine e la meta: studi in memoria di Emanuele Samek Lodovici con un suo inedito. Milano: Edizioni Ares. pp. 139-150.
    The article concerns the topic of gnosticism in modern and contemporary philosophy as a refusal of finite beings, of the degrees of knowledge and of the diversity and plurality of beings.
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  14. Cosmology.Alexis Karpouzos (ed.) - 2015 - Think Lab.
    In modern philosophy of nature the World is unified and holistic. Cosmic Universe and Human History, microcosm and macrocosm, inorganic and living matter coexist and form a unique unity manifested in multiple forms. The Physical and the Mental constitute the form and the content of the World. The world does not consist of subjects and objects, the “subject” and the “object” are metaphysical abstractions of the single and indivisible Wholeness. Man’s finite knowledge separates the Whole into parts and (...)
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  15. (2 other versions)Cosmology, Philosophy, and Physics.Alexis Karpouzos & Αλέξης καρπούζος - 2015 - COSMIC SPIRIT.
    In modern philosophy of nature the World is unified and holistic. Cosmic Universe and Human History, microcosm and macrocosm, inorganic and living matter coexist and form a unique unity manifested in multiple forms. The Physical and the Mental constitute the form and the content of the World. The world does not consist of subjects and objects, the “subject” and the “object” are metaphysical abstractions of the single and indivisible Wholeness. Man’s finite knowledge separates the Whole into parts and (...)
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  16.  56
    Concept in Hegel`s Phenomenology of Spirit.Afshin Alikhani - 2024 - Wisdom and Philosophy 20 (78):103-128.
    In his Phenomenology of the Spirit, Hegel tries to explicate his claim that what he calls the System of Science should be organized merely through the "Life of Concept". In this paper, first, we will try to survey the role(s) Hegel assigns to the Concept in Phenomenology of Spirit. Then, we will examine his use of this term in Phenomenology of the Spirit and we will discuss the meanings of this term in that book. Thereafter We will discuss whether in (...)
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  17. Probabilities on Sentences in an Expressive Logic.Marcus Hutter, John W. Lloyd, Kee Siong Ng & William T. B. Uther - 2013 - Journal of Applied Logic 11 (4):386-420.
    Automated reasoning about uncertain knowledge has many applications. One difficulty when developing such systems is the lack of a completely satisfactory integration of logic and probability. We address this problem directly. Expressive languages like higher-order logic are ideally suited for representing and reasoning about structured knowledge. Uncertain knowledge can be modeled by using graded probabilities rather than binary truth-values. The main technical problem studied in this paper is the following: Given a set of sentences, each having some (...)
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  18.  84
    Why there can be no mathematical or meta-mathematical proof of consistency for ZF.Bhupinder Singh Anand - manuscript
    In the first part of this investigation we highlight two, seemingly irreconcilable, beliefs that suggest an impending crisis in the teaching, research, and practice of—primarily state-supported—mathematics: (a) the belief, with increasing, essentially faith-based, conviction and authority amongst academics that first-order Set Theory can be treated as the lingua franca of mathematics, since its theorems—even if unfalsifiable—can be treated as ‘knowledge’ because they are finite proof sequences which are entailed finitarily by self-evidently Justified True Beliefs; and (b) the slowly (...)
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  19. On the Necessity of the Categories.Anil Gomes, Andrew Stephenson & Adrian Moore - 2022 - Philosophical Review 131 (2):129–168.
    For Kant, the human cognitive faculty has two sub-faculties: sensibility and the understanding. Each has pure forms which are necessary to us as humans: space and time for sensibility; the categories for the understanding. But Kant is careful to leave open the possibility of there being creatures like us, with both sensibility and understanding, who nevertheless have different pure forms of sensibility. They would be finite rational beings and discursive cognizers. But they would not be human. And this raises (...)
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  20. Spinoza on Essences, Universals, and Beings of Reason.Karolina Hübner - 2015 - Pacific Philosophical Quarterly 97 (1):58-88.
    The article proposes a new solution to the long-standing problem of the universality of essences in Spinoza's ontology. It argues that, according to Spinoza, particular things in nature possess unique essences, but that these essences coexist with more general, mind-dependent species-essences, constructed by finite minds on the basis of similarities that obtain among the properties of formally-real particulars. This account provides the best fit both with the textual evidence and with Spinoza's other metaphysical and epistemological commitments. The article offers (...)
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  21. Differences in Individuation and Vagueness.W. Grafe - 1981 - In A. Hartkämper & Heinz-Jürgen Schmidt (eds.), Structure and Approximation in Physical Theories. New York City, New York, USA: [ Content courtesy of Springer Nature, terms of use apply ]. pp. 113-122.
    I. EPISTEMOLOGICAL SUGGESTIONS From an epistemological view, classifying a statement as 'vague' means to judge the statement in question to be a mixture from partial knowledge and partial ignorance. Accordingly it seems desirable to describe the boundary between knowledge and ignorance hidden in the vague statement. -/- Ludwig discusses vagueness in physics, especially vagueness in measuring statements. The example he uses is 'measurement of Euclidean distance', i.e. the meaning of statements which are often written as "d(x,y) = α (...)
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  22. On the Moral Epistemology of Ideal Observer Theories.Jason Kawall - 2006 - Ethical Theory and Moral Practice 9 (3):359-374.
    : In this paper I attempt to defuse a set of epistemic worries commonly raised against ideal observer theories. The worries arise because of the omniscience often attributed to ideal observers – how can we, as finite humans, ever have access to the moral judgements or reactions of omniscient beings? I argue that many of the same concerns arise with respect to other moral theories (and that these concerns do not in fact reveal genuine flaws in any of these (...)
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  23. Conceptual Analysis and Epistemic Progress.Magdalena Balcerak Jackson - 2013 - Synthese 190 (15):3053-3074.
    This essay concerns the question of how we make genuine epistemic progress through conceptual analysis. Our way into this issue will be through consideration of the paradox of analysis. The paradox challenges us to explain how a given statement can make a substantive contribution to our knowledge, even while it purports merely to make explicit what one’s grasp of the concept under scrutiny consists in. The paradox is often treated primarily as a semantic puzzle. However, in “Sect. 1” I (...)
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  24. Truth-Theoretic Semantics and Its Limits.Kirk Ludwig - 2017 - Argumenta (3):21-38.
    Donald Davidson was one of the most influential philosophers of the last half of the 20th century, especially in the theory of meaning and in the philosophy of mind and action. In this paper, I concentrate on a field-shaping proposal of Davidson’s in the theory of meaning, arguably his most influential, namely, that insight into meaning may be best pursued by a bit of indirection, by showing how appropriate knowledge of a finitely axiomatized truth theory for a language can (...)
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  25. Buddhism and effective altruism.Calvin Baker - 2021 - In Stefan Riedener, Dominic Roser & Markus Huppenbauer (eds.), Effective Altruism and Religion: Synergies, Tensions, Dialogue. Baden-Baden, Germany: Nomos. pp. 17-45.
    This article considers the contemporary effective altruism (EA) movement from a classical Indian Buddhist perspective. Following barebones introductions to EA and to Buddhism (sections one and two, respectively), section three argues that core EA efforts, such as those to improve global health, end factory farming, and safeguard the long-term future of humanity, are futile on the Buddhist worldview. For regardless of the short-term welfare improvements that effective altruists impart, Buddhism teaches that all unenlightened beings will simply be reborn upon their (...)
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  26. " Quod nescis quomodo fiat, id non facis". Occasionalism against Descartes?Emanuela Scribano - 2011 - Rinascimento 51:63-86.
    Post-Cartesian Occasionalism argues that the power of causing an effect depends on knowledge of the means by which the effect is produced. The argument is used to deny finite beings the power to act. Arnold Geulincx expresses this thesis in the principle Quod nescis quomodo fiat id non facis. Here, my purpose is to show that: 1. The philosophical problem that is at the origin of the principle Quod nescis quomodo fiat id non facis originates in Galen’s De (...)
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  27. J N MOHANTY (Jiten/Jitendranath) In Memoriam.David Woodruff- Smith & Purushottama Bilimoria - 2023 - Https://Www.Apaonline.Org/Page/Memorial_Minutes2023.
    J. N. (Jitendra Nath) Mohanty (1928–2023). -/- Professor J. N. Mohanty has characterized his life and philosophy as being both “inside” and “outside” East and West, i.e., inside and outside traditions of India and those of the West, living in both India and United States: geographically, culturally, and philosophically; while also traveling the world: Melbourne to Moscow. Most of his academic time was spent teaching at the University of Oklahoma, The New School Graduate Faculty, and finally Temple University. Yet his (...)
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  28. Spinoza on Activity in Sense Perception.Valtteri Viljanen - 2014 - In José Filipe Silva & Mikko Yrjönsuuri (eds.), Active Perception in the History of Philosophy: From Plato to Modern Philosophy. Cham [Switzerland]: Springer. pp. 241-254.
    There can be little disagreement about whether ideas of sense perception are, for Spinoza, to be classed as passions or actions—the former is obviously the correct answer. All this, however, does not mean that sense perception would be, for Spinoza, completely passive. In this essay I argue argues that there is in the Ethics an elaborate—and to my knowledge previously unacknowledged—line of reasoning according to which sense perception of finite things never fails to contain a definite active component. (...)
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  29. The Romantic Absolute.Alison Stone - 2011 - British Journal for the History of Philosophy 19 (3):497-517.
    In this article I argue that the Early German Romantics understand the absolute, or being, to be an infinite whole encompassing all the things of the world and all their causal relations. The Romantics argue that we strive endlessly to know this whole but only acquire an expanding, increasingly systematic body of knowledge about finite things, a system of knowledge which can never be completed. We strive to know the whole, the Romantics claim, because we have an (...)
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  30. NeutroGeometry & AntiGeometry are alternatives and generalizations of the Non-Euclidean Geometries (revisited).Florentin Smarandache - 2021 - Neutrosophic Sets and Systems 46 (1):456-477.
    In this paper we extend the NeutroAlgebra & AntiAlgebra to the geometric spaces, by founding the NeutroGeometry & AntiGeometry. While the Non-Euclidean Geometries resulted from the total negation of one specific axiom (Euclid’s Fifth Postulate), the AntiGeometry results from the total negation of any axiom or even of more axioms from any geometric axiomatic system (Euclid’s, Hilbert’s, etc.) and from any type of geometry such as (Euclidean, Projective, Finite, Affine, Differential, Algebraic, Complex, Discrete, Computational, Molecular, Convex, etc.) Geometry, and (...)
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  31. Compositionality in Davidson’s Early Work.Peter Pagin - 2019 - Journal for the History of Analytical Philosophy 7 (2):76-89.
    Davidson’s 1965 paper, “Theories of Meaning and Learnable Languages”, has invariably been interpreted, by others and by myself, as arguing that natural languages must have a compositional semantics, or at least a systematic semantics, that can be finitely specified. However, in his reply to me in the Żegleń volume, Davidson denies that compositionality is in any need of an argument. How does this add up? In this paper I consider Davidson’s first three meaning theoretic papers from this perspective. I conclude (...)
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  32. Religious Dogma without Religious Fundamentalism.Erik Baldwin - 2012 - Journal of Social Science 8 (1):85-90.
    New Atheists and Anti-Theists (such as Richard Dawkins, Daniel Dennett, Sam Harris, Christopher Hutchins) affirm that there is a strong connection between being a traditional theist and being a religious fundamentalist who advocates violence, terrorism, and war. They are especially critical of Islam. On the contrary, I argue that, when correctly understood, religious dogmatic belief, present in Judaism, Christianity, and Islam, is progressive and open to internal and external criticism and revision. Moreover, acknowledging that human knowledge is finite (...)
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  33. Fichte’s Impossible Contract.Michael Baur - 2006 - In Tom Rockmore & Daniel Breazeale (eds.), Rights, Bodies, Recognition: New Essays on Fichte’s Foundations of Natural Right. Routledge. pp. 11-25.
    As I hope to show in this paper, Fichte’s rejection of traditional social contractarian accounts of human social relations is related to his rejection of the search for a criterion, or external standard, by which we might measure our knowledge in epistemology. More specifically, Fichte’s account of the impossibility of a normative social contract (as traditionally construed) is related to his account of the impossibility of our knowing things as they might be “in themselves,” separate from and independent of (...)
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  34. La Neutro-Geometría y la Anti-Geometría como Alternativas y Generalizaciones de las Geometrías no Euclidianas.Florentin Smarandache - 2022 - Neutrosophic Computing and Machine Learning 20 (1):91-104.
    In this paper we extend Neutro-Algebra and Anti-Algebra to geometric spaces, founding Neutro/Geometry and AntiGeometry. While Non-Euclidean Geometries resulted from the total negation of a specific axiom (Euclid's Fifth Postulate), AntiGeometry results from the total negation of any axiom or even more axioms of any geometric axiomatic system (Euclidean, Hilbert, etc. ) and of any type of geometry such as Geometry (Euclidean, Projective, Finite, Differential, Algebraic, Complex, Discrete, Computational, Molecular, Convex, etc.), and Neutro-Geometry results from the partial negation of (...)
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  35. The Logic of Sequence Frames.Fabio Lampert - 2022 - Review of Symbolic Logic 15 (1):101-132.
    This paper investigates and develops generalizations of two-dimensional modal logics to any finite dimension. These logics are natural extensions of multidimensional systems known from the literature on logics for a priori knowledge. We prove a completeness theorem for propositional n-dimensional modal logics and show them to be decidable by means of a systematic tableau construction.
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  36. Newman on the Problem of the Partiality and Unity of the Sciences.Michael Baur - 2004 - Proceedings of the American Catholic Philosophical Association 77:111-127.
    This paper focuses on Newman’s approach to what we might call “the problem of the partiality and unity of the sciences.” The problem can be expressed in the form of a question: “If all human knowing is finite and partial, then on what grounds can one know of the unity and wholeness of all the sciences?” Newman’s solution to the problem is openly theistic, since it appeals to one’s knowledge of God. For Newman, even if I exclusively pursue (...)
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  37. God, Horrors, and Our Deepest Good.Bruce Langtry - 2020 - Faith and Philosophy 37 (1):77-95.
    J.L. Schellenberg argues that since God, if God exists, possesses both full knowledge by acquaintance of horrific suffering and also infinite compassion, the occurrence of horrific suffering is metaphysically incompatible with the existence of God. In this paper I begin by raising doubts about Schellenberg’s assumptions about divine knowledge by acquaintance and infinite compassion. I then focus on Schellenberg’s claim that necessarily, if God exists and the deepest good of finite persons is unsurpassably great and can be (...)
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  38. Dynamic Tableaux for Dynamic Modal Logics.Jonas De Vuyst - 2013 - Dissertation, Vrije Universiteit Brussel
    In this dissertation we present proof systems for several modal logics. These proof systems are based on analytic (or semantic) tableaux. -/- Modal logics are logics for reasoning about possibility, knowledge, beliefs, preferences, and other modalities. Their semantics are almost always based on Saul Kripke’s possible world semantics. In Kripke semantics, models are represented by relational structures or, equivalently, labeled graphs. Syntactic formulas that express statements about knowledge and other modalities are evaluated in terms of such models. -/- (...)
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  39. The Hiddenness Argument and the Ground of Its Soundness.Marek Pepliński - 2021 - Roczniki Filozoficzne 69 (3):253-290.
    The paper refers to the argument from hiddenness as presented in John Schellenberg’s book The Hiddenness Argument and the philosophical views expressed there, making this argument understandable. It is argued that conditionals (1) and (2) are not adequately grounded. Schellenberg has not shown that we have the knowledge necessary to accept the premises as true. His justifications referring to relations between people raise doubts. The paper includes an argument that Schellenberg should substantiate its key claim that God has the (...)
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  40. The frame problem and the physical and emotional basis of human cognition.Carlos Acosta - 2006 - Technoetic Arts 4 (2):151-65.
    This essay focuses on the intriguing relationship between mathematics and physical phenomena, arguing that the brain uses a single spatiotemporal- causal objective framework in order to characterize and manipulate basic external data and internal physical and emotional reactive information, into more complex thought and knowledge. It is proposed that multiple hierarchical permutations of this single format eventually give rise to increasingly precise visceral meaning. The main thesis overcomes the epistemological complexities of the Frame Problem by asserting that the primal (...)
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  41. Natorp's mathematical philosophy of science.Thomas Mormann - 2022 - Studia Kantiana 20 (2):65 - 82.
    This paper deals with Natorp’s version of the Marburg mathematical philosophy of science characterized by the following three features: The core of Natorp’s mathematical philosophy of science is contained in his “knowledge equation” that may be considered as a mathematical model of the “transcendental method” conceived by Natorp as the essence of the Marburg Neo-Kantianism. For Natorp, the object of knowledge was an infinite task. This can be elucidated in two different ways: Carnap, in the Aufbau, contended that (...)
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  42. How can a line segment with extension be composed of extensionless points?Brian Reese, Michael Vazquez & Scott Weinstein - 2022 - Synthese 200 (2):1-28.
    We provide a new interpretation of Zeno’s Paradox of Measure that begins by giving a substantive account, drawn from Aristotle’s text, of the fact that points lack magnitude. The main elements of this account are (1) the Axiom of Archimedes which states that there are no infinitesimal magnitudes, and (2) the principle that all assignments of magnitude, or lack thereof, must be grounded in the magnitude of line segments, the primary objects to which the notion of linear magnitude applies. Armed (...)
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  43. Spinoza’s EIp10 As a Solution to a Paradox about Rules: A New Argument from the Short Treatise.Michael Rauschenbach - 2020 - Journal of Modern Philosophy 2 (1):12.
    The tenth proposition of Spinoza’s Ethics reads: ‘Each attribute of substance must be conceived through itself.’ Developing and defending the argument for this single proposition, it turns out, is vital to Spinoza’s philosophical project. Indeed, it’s virtually impossible to overstate its importance. Spinoza and his interpreters have used EIp10 to prove central claims in his metaphysics and philosophy of mind (i.e., substance monism, mind-body parallelism, mind-body identity, and finite subject individuation). It’s crucial for making sense of his epistemology (i.e., (...)
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  44.  66
    THE PHILOSOPHY OF KURT GODEL - ALEXIS KARPOUZOS.Alexis Karpouzos - 2024 - The Harvard Review of Philosophy 8 (14):12.
    Gödel's Philosophical Legacy Kurt Gödel's contributions to philosophy extend beyond his incompleteness theorems. He engaged deeply with the work of other philosophers, including Immanuel Kant and Edmund Husserl, and explored topics such as the nature of time, the structure of the universe, and the relationship between mathematics and reality. Gödel's philosophical writings, though less well-known than his mathematical work, offer rich insights into his views on the nature of existence, the limits of human knowledge, and the interplay between the (...)
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  45. Consciousness Studies and Quantum Mechanics.Varanasi Ramabrahmam - 2017 - Http://Scsiscs.Org/Conference/Scienceandscientist/2017/ 5:165-171.
    The limitations and unsuitability of the twentieth century intellectual marvel, the quantum mechanics for the task of unraveling working of human consciousness is critically analyzed. The inbuilt traits of the probabilistic, approximate and imprecise nature of quantum mechanical approach are brought out. -/- The limitations and the unsuitability of using such knowledge for the understanding of precise, correct, finite and definite happenings of activities relating to human consciousness and mind, which are not quantum in nature, are pointed out. (...)
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  46. Aristotle's Theory of Predication.Mohammad Ghomi - manuscript
    Predication is a lingual relation. We have this relation when a term is said (λέγεται) of another term. This simple definition, however, is not Aristotle’s own definition. In fact, he does not define predication but attaches his almost in a new field used word κατηγορεῖσθαι to λέγεται. In a predication, something is said of another thing, or, more simply, we have ‘something of something’ (ἓν καθ᾿ ἑνὸς). (PsA. , A, 22, 83b17-18) Therefore, a relation in which two terms are posited (...)
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  47. Jewish Themes in Spinoza's Philosophy (review).Yisrael Yehoshua Melamed - 2003 - Journal of the History of Philosophy 41 (3):417-418.
    In lieu of an abstract, here is a brief excerpt of the content:Journal of the History of Philosophy 41.3 (2003) 417-418 [Access article in PDF] Heidi M. Ravven and Lenn E. Goodman, editors. Jewish Themes in Spinoza's Philosophy. Albany: The State University of New York Press, 2002. Pp. ix + 290. Cloth, $78.50. Paper, $26.95.The current anthology presents an important contribution to the study of Spinoza's relation to Jewish philosophy as well as to contemporary scholarship of Spinoza's metaphysics and political (...)
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  48. Introduction: Where Intelligibility Gives Out.Jens Pier - 2023 - In Limits of Intelligibility: Issues from Kant and Wittgenstein. London: Routledge.
    There is a confounding issue at the very heart of philosophical reflection. It is the question of where, and in what sense, the bounds of intelligible thought, knowledge, and speech are to be drawn. To inquire into these limits is to acknowledge that we are “finite thinking beings,” as Kant puts it. Indeed, one way of understanding our essentially problematic position in the world which leads us into philosophy is to view it as a position of being fated (...)
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  49.  41
    The Day in which All Cows are White: Spinoza's Acosmism in Another Light.Jason Dockstader - 2014 - Society and Politics 8 (1):92-112.
    In this essay, I aim to defend Spinoza against Hegel’s claim that he annihilated finite things and the real differences they instantiate. To counter Hegel’s charge of acosmism, I try to conceive of a Spinozist kind of acosmism that would mean not a metaphysical eliminativism or nihilism about finitude and diversity, but rather a metaphysical fictionalism about finitude that entails a latent application of the principle of the discernibility of identicals. I do this by focusing on the correspondence between (...)
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  50. Sufficient Reason & The Axiom of Choice, an Ontological Proof for One Unique Transcendental God for Every Possible World.Assem Hamdy - manuscript
    Chains of causes appear when the existence of God is discussed. It is claimed by some that these chains must be finite and terminated by God. But these chains seem endless through our knowledge search. This endlessness for the physical reasons for any world event expresses the greatness and complexity of God’s creation and so the transcendence of God. So, only we can put our hands on physical reasons in an endless forage for knowledge. Yet, the endlessness (...)
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