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Nonexistent objects

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In metaphysics and ontology, nonexistent objects are a concept advanced by Austrian philosopher Alexius Meinong in the 19th and 20th centuries within a "theory of objects". He was interested in intentional states which are directed at nonexistent objects. Starting with the "principle of intentionality", mental phenomena are intentionally directed towards an object. People may imagine, desire or fear something that does not exist. Other philosophers concluded that intentionality is not a real relation and therefore does not require the existence of an object, while Meinong concluded there is an object for every mental state whatsoever—if not an existent then at least a nonexistent one.[1]

Round square copula

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The round square copula is a common example of the dual copula strategy used in reference to the "problem of nonexistent objects" as well as their relation to problems in modern philosophy of language.[2]

The issue arose, most notably, between the theories of contemporary philosophers Alexius Meinong (see Meinong's 1904 book Investigations in Theory of Objects and Psychology)[3] and Bertrand Russell (see Russell's 1905 article "On Denoting").[4] Russell's critique of Meinong's theory of objects, also known as the Russellian view, became the established view on the problem of nonexistent objects.[5]

In late modern philosophy, the concept of the "square circle" (German: viereckiger Kreis) had also been discussed before in Gottlob Frege's The Foundations of Arithmetic (1884).[6]

The dual copula strategy

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The strategy employed is the dual copula strategy,[2] also known as the dual predication approach,[7] which is used to make a distinction between relations of properties and individuals. It entails creating a sentence that is not supposed to make sense by forcing the term "is" into ambiguous meaning.

The dual copula strategy was originally brought to prominence in contemporary philosophy by Ernst Mally.[8][9] Other proponents of this approach include: Héctor-Neri Castañeda, William J. Rapaport, and Edward N. Zalta.[10]

By borrowing Zalta's notational method (Fb stands for b exemplifies the property of being F; bF stands for b encodes the property of being F), and using a revised version of Meinongian object theory which makes use of a dual copula distinction (MOTdc), we can say that the object called "the round square" encodes the property of being round, the property of being square, all properties implied by these, and no others.[2] But it is true that there are also infinitely many properties being exemplified by an object called the round square (and, really, any object)—e.g. the property of not being a computer, and the property of not being a pyramid. Note that this strategy has forced "is" to abandon its predicative use, and now functions abstractly.

When one now analyzes the round square copula using the MOTdc, one will find that it now avoids the three common paradoxes: (1) The violation of the law of noncontradiction, (2) The paradox of claiming the property of existence without actually existing, and (3) producing counterintuitive consequences. Firstly, the MOTdc shows that the round square does not exemplify the property of being round, but the property of being round and square. Thus, there is no subsequent contradiction. Secondly, it avoids the conflict of existence/non-existence by claiming non-physical existence: by the MOTdc, it can only be said that the round square simply does not exemplify the property of occupying a region in space. Finally, the MOTdc avoids counterintuitive consequences (like a 'thing' having the property of nonexistence) by stressing that the round square copula can be said merely to encode the property of being round and square, not actually exemplifying it. Thus, logically, it does not belong to any set or class.

In the end, what the MOTdc really does is create a kind of object: a nonexistent object that is very different from the objects we might normally think of. Occasionally, references to this notion, while obscure, may be called "Meinongian objects."

The dual property strategy

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Making use of the notion of "non-physically existent" objects is controversial in philosophy, and created the buzz for many articles and books on the subject during the first half of the 20th century. There are other strategies for avoiding the problems of Meinong's theories, but they suffer from serious problems as well.

First is the dual property strategy,[2] also known as the nuclear–extranuclear strategy.[2]

Mally introduced the dual property strategy,[11][12] but did not endorse it. The dual property strategy was eventually adopted by Meinong.[9] Other proponents of this approach include: Terence Parsons and Richard Routley.[10]

According to Meinong, it is possible to distinguish the natural (nuclear) properties of an object, from its external (extranuclear) properties. Parsons identifies four types of extranuclear properties: ontological, modal, intentional, technical—however, philosophers dispute Parson's claims in number and kind. Additionally, Meinong states that nuclear properties are either constitutive or consecutive, meaning properties that are either explicitly contained or implied/included in a description of the object. Essentially the strategy denies the possibility for objects to have only one property, and instead they may have only one nuclear property. Meinong himself, however, found this solution to be inadequate in several ways and its inclusion only served to muddle the definition of an object.

The other worlds strategy

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There is also the other worlds strategy.[2] Similar to the ideas explained with possible worlds theory, this strategy employs the view that logical principles and the law of contradiction have limits, but without assuming that everything is true. Enumerated and championed by Graham Priest, who was heavily influenced by Routley, this strategy forms the notion of "noneism". In short, assuming there exist infinite possible and impossible worlds, objects are freed from necessarily existing in all worlds, but instead may exist in impossible worlds (where the law of contradiction does not apply, for example) and not in the actual world. Unfortunately, accepting this strategy entails accepting the host of problems that come with it, such as the ontological status of impossible worlds.

See also

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References

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  1. ^ Stanford Encyclopedia of Philosophy, "Nonexistent Objects: Historical Roots".
  2. ^ a b c d e f Reicher, Maria (2014). "Nonexistent Objects". In Zalta, Edward N. (ed.). Stanford Encyclopedia of Philosophy.
  3. ^ Alexius Meinong, "Über Gegenstandstheorie" ("The Theory of Objects"), in Alexius Meinong, ed. (1904). Untersuchungen zur Gegenstandstheorie und Psychologie (Investigations in Theory of Objects and Psychology), Leipzig: Barth, pp. 1–51.
  4. ^ Bertrand Russell, "On Denoting," Mind, New Series, Vol. 14, No. 56. (Oct. 1905), pp. 479–493. online text, doi:10.1093/mind/XIV.4.479, JSTOR text.
  5. ^ Zalta 1983, p. 5.
  6. ^ Gottlob Frege, The Foundations of Arithmetic, Northwestern University Press, 1980[1884], p. 87.
  7. ^ Jacek Paśniczek, The Logic of Intentional Objects: A Meinongian Version of Classical Logic, Springer, 1997, p. 125.
  8. ^ Mally, Ernst, Gegenstandstheoretische Grundlagen der Logik und Logistik, Leipzig: Barth, 1912, §33.
  9. ^ a b Ernst Mally – The Metaphysics Research Lab
  10. ^ a b Dale Jacquette, Meinongian Logic: The Semantics of Existence and Nonexistence, Walter de Gruyter, 1996, p. 17.
  11. ^ Mally, Ernst. 1909. "Gegenstandstheorie und Mathematik", Bericht Über den III. Internationalen Kongress für Philosophie zu Heidelberg (Report of the Third International Congress of Philosophy, Heidelberg), 1–5 September 1908; ed. Professor Dr. Theodor Elsenhans, 881–886. Heidelberg: Carl Winter’s Universitätsbuchhandlung. Verlag-Nummer 850. Translation: Ernst Mally, "Object Theory and Mathematics", in: Jacquette, D., Alexius Meinong, The Shepherd of Non-Being (Berlin/Heidelberg: Springer, 2015), pp. 396–404, esp. 397.
  12. ^ Dale Jacquette, Meinongian Logic: The Semantics of Existence and Nonexistence, Walter de Gruyter, 1996, p. 16.

Sources

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  • Zalta, Edward N. (1983). Abstract Objects: An Introduction to Axiomatic Metaphysics. Synthese Library. Vol. 160. Dordrecht, Netherlands: D. Reidel Publishing Company. ISBN 978-90-277-1474-9.