A lot of it has to do with using a cell phone keyboard and not wanting to get too technical here. But maybe Jon is right about "the List can take it."
I should have said that aleph(n) is the cardinality of the power set of a set with cardinality aleph(n-1). That's slightly different from what I said before. Frank --- Frank C. Wimberly 140 Calle Ojo Feliz, Santa Fe, NM 87505 505 670-9918 Santa Fe, NM On Thu, Jul 23, 2020, 11:40 AM uǝlƃ ↙↙↙ <[email protected]> wrote: > Thanks for putting in a little more effort. So, in your definitions, > 1/aleph0 = 1/aleph1. That's tightly analogous, if not identical, to saying > a point is divisible because point/2 = point. But before you claimed a > point is indivisible. So, if you were more clear about which authority you > were citing when you make your claims, we wouldn't have these discussions. > > On 7/23/20 10:35 AM, Frank Wimberly wrote: > > I am aware of the hierarchy of infinities. Aleph0 is the cardinality of > the integers. Aleph1 is the cardinality of the power set of the integers > which is the cardinality of the real numbers (that's a theorem which is > easy but I don't feel like typing it on a cellphone keyboard). Aleph2 is > the cardinality of the power set of aleph1, etc. > > > > In my definition of 1/infinity, assume infinity means aleph0. But I > believe it works for any infinite number. That last word is important. > > -- > ↙↙↙ uǝlƃ > > - .... . -..-. . -. -.. -..-. .. ... -..-. .... . .-. . > FRIAM Applied Complexity Group listserv > Zoom Fridays 9:30a-12p Mtn GMT-6 bit.ly/virtualfriam > un/subscribe http://redfish.com/mailman/listinfo/friam_redfish.com > archives: http://friam.471366.n2.nabble.com/ > FRIAM-COMIC <http://friam.471366.n2.nabble.com/FRIAM-COMIC> > http://friam-comic.blogspot.com/ >
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