I have disproven that an infinite set necessarily contains every arbitrary possibility. And quite simply, too. Notice how the set of natural numbers does not contain any grapes.
Thus, the burden of proof is now on those who claim they do know what is in the multiverse. Such as yourself. What evidence do you have for these “junk data” universes?
I’m going to blow your mind with a simple bit of logic. IF the junk data universes don’t exist, then the multiverse isn’t infinite. Order is an infinite subset of disorder.
You’re talking about countable infinities vs uncountable infinities, but you’re proving my point. Order is a countable infinity, disorder is an uncountable infinity. You’ve just abstracted yourself into a corner.
Grapes and real numbers are both finite distinctions of a shared infinitely ordered set, which itself is part of an infinitely disordered set. Numbers are an infinitely ordered set that do not contain grapes. Grapes are part of many finite sets that are also part of an infinitely ordered set. Both exist within disordered and ordered sets as well. You’re not describing limitations of the infinite like you think you are. You’re only describing the limitations of your understanding of the infinite.
I have disproven that an infinite set necessarily contains every arbitrary possibility. And quite simply, too. Notice how the set of natural numbers does not contain any grapes.
Thus, the burden of proof is now on those who claim they do know what is in the multiverse. Such as yourself. What evidence do you have for these “junk data” universes?
I’m going to blow your mind with a simple bit of logic. IF the junk data universes don’t exist, then the multiverse isn’t infinite. Order is an infinite subset of disorder.
Did you learn that from a fortune cookie?
How is the universe infinite if there’s something missing?
The set of natural numbers is infinite. The number 2.5 is missing from that set. Therefore infinite sets do not contain every possibility.
It’s not rocket science
You’re talking about countable infinities vs uncountable infinities, but you’re proving my point. Order is a countable infinity, disorder is an uncountable infinity. You’ve just abstracted yourself into a corner.
sigh, very well then.
Consider the set of real numbers, which is an uncountable infinity. Notice how this infinite set does not contain any grapes.
It’s not rocket science
Grapes and real numbers are both finite distinctions of a shared infinitely ordered set, which itself is part of an infinitely disordered set. Numbers are an infinitely ordered set that do not contain grapes. Grapes are part of many finite sets that are also part of an infinitely ordered set. Both exist within disordered and ordered sets as well. You’re not describing limitations of the infinite like you think you are. You’re only describing the limitations of your understanding of the infinite.
Well, yes, obviously different infinite sets have different contents. Do you have a point that’s actually relevant to what we’re talking about?