Much Ado About the Many

Q3 Arts and Humanities
Jonathan Mai
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引用次数: 0

Abstract

English distinguishes between singular quantifiers like "a donkey" and plural quantifiers like "some donkeys". Pluralists hold that plural quantifiers range in an unusual, irreducibly plural, way over common objects, namely individuals from first-order domains and not over set-like objects. The favoured framework of pluralism is plural first-order logic, PFO, an interpreted first-order language that is capable of expressing plural quantification. Pluralists argue for their position by claiming that the standard formal theory based on PFO is both ontologically neutral and really logic. These properties are supposed to yield many important applications concerning second-order logic and set theory that alternative theories supposedly cannot deliver. I will show that there are serious reasons for rejecting at least the claim of ontological innocence. Doubt about innocence arises on account of the fact that, when properly spelled out, the PFO-semantics for plural quantifiers is committed to set-like objects. The correctness of my worries presupposes the principle that for every plurality there is a coextensive set. Pluralists might reply that this principle leads straight to paradox. However, as I will argue, the true culprit of the paradox is the assumption that every definite condition determines a plurality.
多此一举
英语区分单数量词,如“a donkey”和复数量词,如“some donkey”。复数主义者认为,复数量词以一种不寻常的、不可约复数的方式,适用于普通对象,即来自一阶域的个体,而不适用于类集合对象。多元主义的有利框架是多元一阶逻辑,即PFO,一种能够表达多元量化的一阶语言。多元主义者通过声称基于PFO的标准形式理论在本体论上是中立的,并且是真正的逻辑来论证他们的立场。这些性质被认为产生了许多关于二阶逻辑和集合论的重要应用,而替代理论被认为无法提供这些应用。我将证明,有一些严肃的理由,至少可以拒绝本体论的无罪主张。对无罪的怀疑产生于这样一个事实,即当正确地拼写时,复数量词的pfo语义被用于类集合对象。我的担忧之所以正确,是以这样一个原则为前提的:对于每一个复数,都有一个共延的集合。多元主义者可能会回答说,这个原则直接导致悖论。然而,正如我将要论证的那样,这个悖论的真正罪魁祸首是每一个确定的条件都决定了多元性的假设。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Principia
Principia Arts and Humanities-Philosophy
CiteScore
0.20
自引率
0.00%
发文量
21
审稿时长
18 weeks
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