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291.
Dorota Leszczyńska-Jasion 《Studia Logica》2008,89(3):365-399
The aim of this paper is to present the method of Socratic proofs for seven modal propositional logics: K5, S4.2, S4.3, S4M, S4F, S4R and G. This work is an extension of [10] where the method was presented for the most common modal propositional logics: K, D, T, KB, K4, S4 and S5.
Presented by Jacek Malinowski 相似文献
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Marcin Wodziński 《Jewish History》2013,27(2-4):399-434
Hasidism has often been defined and viewed as a sect. By implication, if Hasidism was indeed a sect, then membership would have encompassed all the social ties of the “sectarians,” including their family ties, thus forcing us to consider their mothers, wives, and daughters as full-fledged female hasidim. In reality, however, women did not become hasidim in their own right, at least not in terms of the categories implied by the definition of Hasidism as a sect. Reconsideration of the logical implications of the identification of Hasidism as a sect leads to a radical re-evaluation of the relationship between the hasidic movement and its female constituency, and, by extension, of larger issues concerning the boundaries of Hasidism. 相似文献
297.
Cezary Cieśliński 《Journal of Philosophical Logic》2010,39(3):325-337
By a classical result of Kotlarski, Krajewski and Lachlan, pathological satisfaction classes can be constructed for countable,
recursively saturated models of Peano arithmetic. In this paper we consider the question of whether the pathology can be eliminated;
we ask in effect what generalities involving the notion of truth can be obtained in a deflationary truth theory (a theory
of truth which is conservative over its base). It is shown that the answer depends on the notion of pathology we adopt. It
turns out in particular that a certain natural closure condition imposed on a satisfaction class—namely, closure of truth
under sentential proofs—generates a nonconservative extension of a syntactic base theory (Peano arithmetic). 相似文献
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