In Defence of Discrete Plural Logic (or How to Avoid Logical Overmedication When Dealing with Internally Singularized Pluralities)

IF 0.1 Q3 Arts and Humanities
Gustavo Picazo
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Abstract

Abstract In recent decades, plural logic has established itself as a well-respected member of the extensions of first-order classical logic. In the present paper, I draw attention to the fact that among the examples that are commonly given in order to motivate the need for this new logical system, there are some in which the elements of the plurality in question are internally singularized (e.g. ‘Whitehead and Russell wrote Principia Mathematica’), while in others they are not (e.g. ‘Some philosophers wrote Principia Mathematica’). Then, building on previous work, I point to a subsystem of plural logic in which inferences concerning examples of the first type can be adequately dealt with. I notice that such a subsystem (here called ‘discrete plural logic’) is in reality a mere variant of first-order logic as standardly formulated, and highlight the fact that it is axiomatizable while full plural logic is not. Finally, I urge that greater attention be paid to discrete plural logic and that discrete plurals are not used in order to motivate the introduction of full-fledged plural logic—or, at least, not without remarking that they can also be adequately dealt with in a considerably simpler system.
捍卫离散多元逻辑(或如何避免处理内部单一多元时的逻辑过度用药)
摘要近几十年来,复数逻辑已经成为一阶经典逻辑扩展中备受推崇的一员。在本文中,我提请注意这样一个事实,即在为了激发对这种新逻辑系统的需求而通常给出的例子中,有一些例子中所讨论的复数元素在内部是单一性的(例如怀特黑德和罗素写的《数学原理》),而在其他例子中则不是(例如,一些哲学家写的《数学原理》)。然后,在先前工作的基础上,我指出了复数逻辑的一个子系统,在这个子系统中,关于第一种类型的例子的推理可以得到充分处理。我注意到这样一个子系统(这里称为“离散复数逻辑”)实际上只是标准表述的一阶逻辑的变体,并强调它是公理化的,而完整复数逻辑则不是。最后,我强烈要求对离散复数逻辑给予更多的关注,并且使用离散复数不是为了激励引入成熟的复数逻辑——或者,至少,不是没有说明它们也可以在一个相当简单的系统中充分处理。
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
Disputatio (Spain)
Disputatio (Spain) Arts and Humanities-Philosophy
CiteScore
0.30
自引率
0.00%
发文量
0
审稿时长
35 weeks
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