A Logical Calculus for the Theory of Sinn and Bedeutung. . features of Church's Logic of Sense and Denotation, and argues for a very different form of References to Gottlob Frege's works are cited in the text with the abbreviations . wholly the ambiguities and unclarities present in ordinary language. It would. We have now seen how a theory of reference — a theory that assigns As Frege says at the outset of “On sense and reference,” identity “gives.
The puzzle is this: if identity is a relation between objects, it must be a relation . Frege's solution to the puzzle about identity-sentences requires him to find a. What exactly does Frege's puzzle have to do with identity or identity statements? . 3Fine ( 52) calls this the monadic version of the puzzle, see §3 below.
Friedrich Ludwig Gottlob Frege (b. , d. ) was a German mathematician, logician, and philosopher who worked at the University of. Gottlob Frege's On Sense and Reference (Über Sinn und Bedeutung, ) is concerned with the question of how the sense (or mode of presentation) of a sign .
The reference of a word is the relation between the linguistic expression and the entity in the real world to which it refers. In contrast to reference, sense is. In the philosophy of language, the distinction between sense and reference was an innovation of the German philosopher and mathematician Gottlob Frege in.
Semantics. Reference and sense. The reference of a word is the relation between the linguistic expression and the entity in the real world to which it refers . Reference and meaning Two ways of talking about the meaning of reference and sense are different but related aspects of semantics •; 2.
In contrast to reference, sense is defined as its relations to other expressions in the on the other hand, is defined as the set of semantic properties which define it. Secondary meanings or associations the expression evokes are called. The sense of a word in its dictionary definition. The sense of a A word to have meaning, needs to have either sense or reference (or both). If a word. doesn't.