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It has been suggested that this article ( definite descriptions) be merged with the main article " theory of descriptions". The "theory of descriptions" entry also includes information about indefinite descriptions, among other things. It would also be good to get the criticism info from here over to there, since it applies to Russell's general theory. I, for one, agree that it should be merged. Any objections? -- Jaymay 16:52, 1 August 2006 (UTC)
"Since there is no present King of France, the phrase fails to refer, and so the sentence is neither true nor false, but meaningless."
I do not think that Strawson would say that the sentence is meaningless. As I understand it, the sentence has meaning in and of itself, but the utterance of the sentence cannot be given a truth value. Strawson would certainly maintain that the sentence was meaningful even if its use did not express a complete proposition.
-- Rubie 16:08, 23 January 2006 (UTC)
-- Matt9090 24 Jan. 2006
The article says to refer to the bottom about Philosophers who considered the term meaningless, but there is nothing at the bottom relating to it. Am I missing something? Jeek X ( talk) 02:51, 5 August 2008 (UTC)
In the explanation of the "three separate assertions" the formalization "(∀x(Fx → Bx))" of the statement "x is bald" is wrong. In ths context, the proper formalization of "x is bald" would be simply Bx. (The quantifier was already introduced in the second assertion).
-- Eddie 01:15, 29 Dec. 2007 —Preceding unsigned comment added by 217.83.116.213 ( talk) 00:24, 29 December 2007 (UTC)
"it is not the case that there exists an x, therefore x is neither bald nor not bald" You have to be careful here and refrain from saying that this sentence is true, because the entire point of the ongoing example is to say that the sentence "the current king of france is bald" is FALSE because there is no current king of france-- which point can be re-stated as "it is not the case that there exists an x, therefore to say anything of x is to make an unfelicitous assertion". so the non-existence of the subject (x) in question PREVENTS any qualities being assigned to it, and you cannot therefore say that the subject is "neither b nor c", because you have just removed it from being eligible form such a statement. —Preceding unsigned comment added by 98.207.112.202 ( talk) 03:35, 18 March 2008 (UTC)
I'm sorry but there's no way mathematic sentence structure can be considered worthy of common knowledge. — Preceding unsigned comment added by 24.3.150.95 ( talk) 19:17, 12 February 2012 (UTC)
Someone made a cutesy "present king of France" graphic... AnonMoos 17:11, 18 October 2007 (UTC)
Regarding the "Mathematical logic" section: Most authors (including Russell) use the inverted (rotated) iota for this binding operator. I think this is a better notation, analogous to the rotated A and flipped E for "for all" and "exists". The LaTeX code is "\mathrm{\rotatebox[origin=C]{180}{$\iota$}}" (requires the \graphicx package) and Unicode is ℩ (℩). I'm not sure about the math conventions for Wikipedia, so I'll defer to others to add a note about this convention if they wish. 146.115.68.200 ( talk) 17:22, 2 December 2013 (UTC)
On behalf of the general audience, I have replaced the misleading and confusing expression "just in case", with its correct, and easily understood equivalent, " if, and only if" (also, in more technical writing, "if and only if"). The following explains the error:
Why are we asked to "see also" John Searle when he isn't mentioned in the body of the article? 86.132.222.146 ( talk) 14:39, 2 May 2017 (UTC)
The Mathematical Logic section states the following:
"There is exactly one and it has the property ":
However, the given formula doesn't really say this at all. For example, if both and are false for every , the formula will be true for any witness .
Gilith ( talk) 05:51, 11 March 2018 (UTC)
You are right. I guess, introducing additional parantheses could be a remedy: ; however, I'm not quite sure. - Jochen Burghardt ( talk) 19:51, 15 March 2018 (UTC)