On the Logic of Classes as Many
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Date
2002-04
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Studia Logica
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Abstract
The notion of a "class as many" was central to Bertrand Russell's early form of logicism in his 1903 Principles of Mathematics. There is no empty class in this sense, and the singleton of an urelement (or atom in our reconstruction) is identical with that urelement. Also, classes with more than one member are merely pluralities — or what are sometimes called "plural objects" — and cannot as such be themselves members of classes. Russell did not formally develop this notion of a class but used it only informally. In what follows, we give a formal, logical reconstruction of the logic of classes as many as pluralities (or plural objects) within a fragment of the framework of conceptual realism. We also take groups to be classes as many with two or more members and show how groups provide a semantics for plural quantifier phrases.
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This is a post-peer-review, pre-copyedit version of an article published in Studia Logica. The final authenticated version is available online at: https://doi.org/10.1023/A:1015190829525
Keywords
class(es) as many, atom, common names, plural reference, plural objects, nominalization, extensionality
Citation
Cocchiarella, N. "On the Logic of Classes as Many," Studia Logica, vol. 70 no. 3 (2002): 303- 338.
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