On Wednesday, February 5, 2020 at 3:12:39 AM UTC-7, John Clark wrote: > > > > On Wed, Feb 5, 2020 at 3:29 AM Alan Grayson <[email protected] > <javascript:>> wrote: > > *> The answer is NO, if at least one parameter of the universe can >> continuously vary, even along a finite interval or dimension. In this case, >> the number of possible universes is UNCOUNTABLE, and IIUC, under this >> condition Poincare Recurrence doesn't apply. AG * >> > > *That statement makes absolutely no sense, none whatsoever. And NO, you do > not understand correctly * > > *John K Clark* >
*Poincare Recurrence doesn't apply for a universe with uncountably many possible states. This was suggested in the video. I might go back and give you the time stamp. In any event, since I can tie my shoes in an uncountable number of ways if space is continuous, it defies common sense to think uncountable universes come into being by such a simple act. I know you think common sense doesn't apply anymore, but alternatively, does it makes sense to totally throw it away? AG* > > > >> >> -- You received this message because you are subscribed to the Google Groups "Everything List" group. To unsubscribe from this group and stop receiving emails from it, send an email to [email protected]. To view this discussion on the web visit https://groups.google.com/d/msgid/everything-list/7a27b4f7-da55-4129-8675-3d4002806da3%40googlegroups.com.
