Results for 'Manus Visser'

9 found
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  1. Rethinking Cantor: Infinite Iterations and the Cardinality of the Reals.Manus Ross - manuscript
    In this paper, I introduce an iterative method aimed at exploring numbers within the interval [0, 1]. Beginning with a foundational set, S0, a series of algorithms are employed to expand and refine this set. Each algorithm has its designated role, from incorporating irrational numbers to navigating non-deterministic properties. With each successive iteration, our set grows, and after infinite iterations, its cardinality is proposed to align with that of the real numbers. This work is an initial exploration into this approach, (...)
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  2. Intermediate Logics and the de Jongh property.Dick Jongh, Rineke Verbrugge & Albert Visser - 2011 - Archive for Mathematical Logic 50 (1-2):197-213.
    We prove that all extensions of Heyting Arithmetic with a logic that has the finite frame property possess the de Jongh property.
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  3. A small reflection principle for bounded arithmetic.Rineke Verbrugge & Albert Visser - 1994 - Journal of Symbolic Logic 59 (3):785-812.
    We investigate the theory IΔ 0 + Ω 1 and strengthen [Bu86. Theorem 8.6] to the following: if NP ≠ co-NP. then Σ-completeness for witness comparison formulas is not provable in bounded arithmetic. i.e. $I\delta_0 + \Omega_1 + \nvdash \forall b \forall c (\exists a(\operatorname{Prf}(a.c) \wedge \forall = \leq a \neg \operatorname{Prf} (z.b))\\ \rightarrow \operatorname{Prov} (\ulcorner \exists a(\operatorname{Prf}(a. \bar{c}) \wedge \forall z \leq a \neg \operatorname{Prf}(z.\bar{b})) \urcorner)).$ Next we study a "small reflection principle" in bounded arithmetic. We prove that for (...)
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  4. Intermediate Logics and the de Jongh property.Dick de Jongh, Rineke Verbrugge & Albert Visser - 2011 - Archive for Mathematical Logic 50 (1-2):197-213.
    We prove that all extensions of Heyting Arithmetic with a logic that has the finite frame property possess the de Jongh property.
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  5. The Mathematical Basis of Creation in Hinduism.Mukundan P. R. - 2022 - In The Modi-God Dialogues: Spirituality for a New World Order. New Delhi: Akansha Publishing House. pp. 6-14.
    The Upanishads reveal that in the beginning, nothing existed: “This was but non-existence in the beginning. That became existence. That became ready to be manifest”. (Chandogya Upanishad 3.15.1) The creation began from this state of non-existence or nonduality, a state comparable to (0). One can add any number of zeros to (0), but there will be nothing except a big (0) because (0) is a neutral number. If we take (0) as Nirguna Brahman (God without any form and attributes), then (...)
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  6. Fixed-Point Posets in Theories of Truth.Stephen Mackereth - 2019 - Journal of Philosophical Logic (1).
    We show that any coherent complete partial order is obtainable as the fixed-point poset of the strong Kleene jump of a suitably chosen first-order ground model. This is a strengthening of Visser’s result that any finite ccpo is obtainable in this way. The same is true for the van Fraassen supervaluation jump, but not for the weak Kleene jump.
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  7. Uponibeshottor Chetonar Aloke prantikayito Janasamaj : Nirbachito Koyekti Uponyase er Pratifalan.Mousumi Nath - 2013 - Pratidhwani the Echo (I).
    Post colonialism is often understood to be a period of time after colonialism and post-colonial literature is usually characterized by its opposition to the colonial discourse. However, any literature that expresses an opposition to colonialism, even if it is written during a colonial period, may be defined as postcolonial literature, primarily due to its oppositional nature. From this point of view, novels like ‘Kankabati’, ‘Nildarpan’, ‘Bolmik’, ‘Tabubihanga’, ‘Aranyer Adhikar’, ‘Droupadi’, ‘Akasher Niche Manus’, and Mohakaler Rather Ghora’ have been discussed (...)
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  8. Kripke Semantics for Fuzzy Logics.Saeed Salehi - 2018 - Soft Computing 22 (3):839–844.
    Kripke frames (and models) provide a suitable semantics for sub-classical logics; for example, intuitionistic logic (of Brouwer and Heyting) axiomatizes the reflexive and transitive Kripke frames (with persistent satisfaction relations), and the basic logic (of Visser) axiomatizes transitive Kripke frames (with persistent satisfaction relations). Here, we investigate whether Kripke frames/models could provide a semantics for fuzzy logics. For each axiom of the basic fuzzy logic, necessary and sufficient conditions are sought for Kripke frames/models which satisfy them. It turns out (...)
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  9. ℋ-theories, fragments of HA and PA -normality.Morteza Moniri - 2002 - Archive for Mathematical Logic 41 (1):101-105.
    For a classical theory T, ℋ(T) denotes the intuitionistic theory of T-normal (i.e. locally T) Kripke structures. S. Buss has asked for a characterization of the theories in the range of ℋ and raised the particular question of whether HA is an ℋ-theory. We show that Ti∈ range(ℋ) iff Ti = ℋ(T). As a corollary, no fragment of HA extending iΠ1 belongs to the range of ℋ. A. Visser has already proved that HA is not in the range of (...)
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