Creative, inspiring and great fun; doubly so in the light of the the half empty aula. Keep up the good work Mr. Priest! Your audience is a flock of turtles: we get it slowly, patiently.
@naayou9911 жыл бұрын
Thank you for posting it. Priest did an awesome job presenting Frege's ideas in a nutshell. would be nice if Priest has a similar presentation on B. Russell.
@MindForgedManacle8 жыл бұрын
Great talk. It had a lot of useful content for me!
@RealNRD10 жыл бұрын
Thanks for posting this!
@randomharass11 жыл бұрын
This was superb. Thank you!
@andrewwells63237 жыл бұрын
A very interesting video. Thank you for uploading.
@braininahat8 жыл бұрын
Great lecture
@oooltra3 жыл бұрын
Thank you for this
@xmikeydx9 жыл бұрын
Thank you very much for this upload.
@cladwith8 жыл бұрын
great
@johnvilla37 жыл бұрын
That all for one and one for all could be unambiguously interpreted by iff wff makes this lecture so much more amazing that the ostrich is willing to reveal 'er head.
@timblackburn15937 жыл бұрын
In the long run we're all enlightened
@stefos64313 жыл бұрын
Sounds to me, a newbie in mathematical philosophy, that Herr Frege was a genius.
@jyak277 жыл бұрын
a set of all sets is a spike
@Blodhosta10 жыл бұрын
They're not quite the same. EyAx(xSy) logically implies AxEy(xSy), but not the other way around. The first singles out an individual standing in the relation to all x; the second says all x stand in that relation to some individual or other. The relation AxEy(xSy ^ (xSz → y=z)) says that everybody saw exactly one person, but not necessarily the same person.
@Kemenesfalvi11 жыл бұрын
I might be wrong but I think EyAx and AxEy mean the same thing. The differents that he wants to show is not in the order, but if we say that: Ax Ey xSy and if xSz->z=y. If i'm wrong about this could somebody explain what's the difference between the two formulation of continuity mean? I studied mathematics so I can read the notations, but I can't figure out the difference.
@tomwright9904
Жыл бұрын
Out of date but for other readers. If, EyAx ySx, then we can take one such y, say Y and then for any x YSx However if AxEy ySx you don't necessarily have such a Y.
Пікірлер: 19
Creative, inspiring and great fun; doubly so in the light of the the half empty aula. Keep up the good work Mr. Priest! Your audience is a flock of turtles: we get it slowly, patiently.
Thank you for posting it. Priest did an awesome job presenting Frege's ideas in a nutshell. would be nice if Priest has a similar presentation on B. Russell.
Great talk. It had a lot of useful content for me!
Thanks for posting this!
This was superb. Thank you!
A very interesting video. Thank you for uploading.
Great lecture
Thank you for this
Thank you very much for this upload.
great
That all for one and one for all could be unambiguously interpreted by iff wff makes this lecture so much more amazing that the ostrich is willing to reveal 'er head.
In the long run we're all enlightened
Sounds to me, a newbie in mathematical philosophy, that Herr Frege was a genius.
a set of all sets is a spike
They're not quite the same. EyAx(xSy) logically implies AxEy(xSy), but not the other way around. The first singles out an individual standing in the relation to all x; the second says all x stand in that relation to some individual or other. The relation AxEy(xSy ^ (xSz → y=z)) says that everybody saw exactly one person, but not necessarily the same person.
I might be wrong but I think EyAx and AxEy mean the same thing. The differents that he wants to show is not in the order, but if we say that: Ax Ey xSy and if xSz->z=y. If i'm wrong about this could somebody explain what's the difference between the two formulation of continuity mean? I studied mathematics so I can read the notations, but I can't figure out the difference.
@tomwright9904
Жыл бұрын
Out of date but for other readers. If, EyAx ySx, then we can take one such y, say Y and then for any x YSx However if AxEy ySx you don't necessarily have such a Y.
AxA
lucid talk