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Non-Existent Concepts

Published online by Cambridge University Press:  13 April 2010

Howard Jackson
Affiliation:
University of British Columbia
Richard E. Robinson
Affiliation:
University of British Columbia

Extract

In the spirit of Frege's gripping opener in “Ueber Sinnund Bedeutung”, one can equally well say that the concept of existence challenges reflection; for how can one deny that Pegasus exists without presuming existence? After all, such claims can be informative, for they could be false. Consequently, one might argue, they must say something about something. Thus, they succeed in being, in a back-handed, paradoxical way, existence statements of a sort. This problem is very old; it is Plato's problem of non-being. Frege's solution to the problem is also well known.

Type
Articles
Copyright
Copyright © Canadian Philosophical Association 1985

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References

1 Thus. Frege's notion of a Funktion cannot be simply identifïed with the usual conception of a function as a set of ordered pairs of a certain kind. i.e., an object. Nor can it be identified with the sense of a function-word (see below).

2 Frege in the Grundgesetze used lower-case Greek letters to mark gaps in functions, and his notation is superior to the one used here; for it can readily distinguish between the concept ξ gt; ξ and the relation ξ gt; η. Nevertheless, as our discussion will be restricted to concepts, we shall stick with his other, more suggestive notation.

3 This requirement on functions is stated explicitly in Frege's, G.Funktion und Begriff (Jena: Hermann Pohle, 1891), as well as in other places; see the posthumously published paper,Google Scholar“Ausführungen über Sinn und Bedeutung”, in Nachgelassene Schriften, ed. Hermes, H., Kambartel, F., and Kaulbach, F. (Hamburg: Felix Meiner, 1969), 133, where Frege writes: “Es muss von jedem Gegenstand bestimmt sein, ob er unter den Begriff falle oder nicht; ein Begriffswort, welches dieser Anforderung an seine Bedeutung nicht genugt, ist Bedeutungslos.” We shall return to this passage belowGoogle Scholar.

4 This point is well argued in Montgomery Furth's Introduction to his partial translation of Frege's Grundgesetze der Arithmetik (The Basic Laws of Arithmetic) (Berkeley and Los Angeles: University of California Press, 1964), cf. xxxix-xliii. It was also argued earlier by Peter Geach (cf.Google ScholarClass and Concept”, The Philosophical Review 64 [1955], 561570); also byCrossRefGoogle ScholarDummett, Michael (“Note: Frege on Functions”, The Philosophical Review 65 [1956], 229230). There is really no doubt that this was Frege's view (cf. “Funktion und Begriff” and “Ausführungen über Sinn und Bedeutung”, to mention only two places where Frege makes this clear). However, it is not quite correct, following Frege, to speak of the identity or non-identity of functions. This would be to treat them as objects, and thus to ignore their peculiar nature—their unsaturatedness. The closest we can come to identity for functions is the identity of their values for all argumentsCrossRefGoogle Scholar.

5 It is perhaps Carnap, Rudolf (cf. Meaning and Necessity [2nd ed.; Chicago: University of Chicago Press, 1956], 125ff.) who is most responsible for furthering a misconception on this scoreGoogle Scholar.

6 Frege, G., “Ueber Begriff und Gegenstand”, Vierteljahrsschrift für Wissenschaftliehcn Philosophie 16 (1892), 200 (our translation)Google Scholar.

7 By way of specifying the intended interpretation of the formal system considered inChurch's, Alonzo “A Formulation of the Logic of Sense and Denotation”, in Structure and Meaning: Essays in Honor of Henry M. Sheffer (New York: Liberal Arts. 1951). 323, Church writes, “… anything which is capable of being the sense ofanameof x is called a concept of x.” Church is well aware that this notion of concept is not that of Frege's Begriff(as he says in the same paragraph from which the preceding quotation is taken)Google Scholar.

8 Cf. footnote 3 above; also Frege, Grundgesetze der Arithmetik, §29. 45f.

9 “Proposition” is used here in the sense of Frege's “Gedanke”, and never in the sense of “declarative sentence”.

10 The relation falls within (fällt in) between functions corresponds to the relation fulls under (fällt unter) between objects and first-level functions.

11 A concept φ( ) is subordinate to a concept ψ( ) iff every object which falls under φ( ) falls under ψ( ).

12 This point has been argued by one of the present authors (in Frege on Sense-Functions”, Analysis 23 [19621963], 8487). Although not objecting to the point, Furth, in the Introduction to his translation of the Grundgesetze, finds that there are problems enough in explaining Frege's views of functions at the level of denotation to be concerned with “sense-functions”Google Scholar.

13 Bell, David, Frege's Theory of Judgement (Oxford: Clarendon Press, 1979)Google Scholar.

14 Ibid., 41.

15 Cf. Frege, . Nachgelassene Schriften, 133Google Scholar.

16 This description is Frege's.

17 This is a translation of the German passage in footnote 3.