There are an infinite number of numbers between 0 and 1, and yet there is no repetition. Pi and other irrational numbers are infinite yet non-repeating. I wish I knew the name for this kind of thing because I’m sure it’s been discussed in philosophy (a kind of opposite, eternal recurrence, has been discussed a lot).
I don’t think anyone knows enough about the universe to say whether or not there is infinite variety in macroscopic stuff, so I don’t think anything can be ruled out.
I don’t think anyone knows enough about the universe to say whether or not there is infinite variety in macroscopic stuff
There are finitely many particles in the observable universe (that is to say, an infinite number will not fit), and a finite granularity to discern the position of those particles. That means there are finitely many configurations of particles within the volume of the observable universe.
Therefore, there are finitely many discernable things, so in a meaningful sense we can say with confidence that there’s a finite variety of macroscopic things.
Whether or not an infinite number of particles will fit or not is not important, no ? I’m not sure what you mean by finite granularity. There is no “grid”, space is continuous, the planck length and the fact that push on each other doesn’t really factor in. By virtue of space being continuous and particles being finite, means you can configure stuff in infinite ways.
Edit: Not quoting you with the reference to a grid. I know that’s not what you mean.
Yes, but distance is still continuous, a minimum measurable distance (between stuff) doesn’t make space granular. I suppose there might be a minimum measurably meaningful number of configurations, but I’m not super convinced.
My claim accounts for the possibility that the distances of particles may physically differ by amounts more granular than a plank length. My statement was that they are indiscernable. There are infinite copys of every person more closely identical than the two most similar identical twins. So closely identical that no physically possible device could ever distinguish between them. We cannot know if space is continuous. We simply know that if it is not continuous, it is of granularity as fine or finer than the plank length. So there is a meaningful sense in which there are finitely many macroscopic objects.
So far nothing in the universe has shown to be infinite, hence any material representation of Gabriel’s Horn can be painted since paint has a thickness.
The Plank length is the shortest possible distance between two material points. Though at that scale even vacuum is tempestuous.
There are infinities without repetition. Usually the proofs for the stuff you describe assumes finite possibilities.
Please elaborate.
There are an infinite number of numbers between 0 and 1, and yet there is no repetition. Pi and other irrational numbers are infinite yet non-repeating. I wish I knew the name for this kind of thing because I’m sure it’s been discussed in philosophy (a kind of opposite, eternal recurrence, has been discussed a lot).
I don’t think anyone knows enough about the universe to say whether or not there is infinite variety in macroscopic stuff, so I don’t think anything can be ruled out.
There are finitely many particles in the observable universe (that is to say, an infinite number will not fit), and a finite granularity to discern the position of those particles. That means there are finitely many configurations of particles within the volume of the observable universe.
Therefore, there are finitely many discernable things, so in a meaningful sense we can say with confidence that there’s a finite variety of macroscopic things.
Whether or not an infinite number of particles will fit or not is not important, no ? I’m not sure what you mean by finite granularity. There is no “grid”, space is continuous, the planck length and the fact that push on each other doesn’t really factor in. By virtue of space being continuous and particles being finite, means you can configure stuff in infinite ways.
Edit: Not quoting you with the reference to a grid. I know that’s not what you mean.
Are you aware of the plank length? It’s the distance less than which which we can no longer determine if 2 things are any closer.
Don’t worry, I understand.
Yes, but distance is still continuous, a minimum measurable distance (between stuff) doesn’t make space granular. I suppose there might be a minimum measurably meaningful number of configurations, but I’m not super convinced.
My claim accounts for the possibility that the distances of particles may physically differ by amounts more granular than a plank length. My statement was that they are indiscernable. There are infinite copys of every person more closely identical than the two most similar identical twins. So closely identical that no physically possible device could ever distinguish between them. We cannot know if space is continuous. We simply know that if it is not continuous, it is of granularity as fine or finer than the plank length. So there is a meaningful sense in which there are finitely many macroscopic objects.
So far nothing in the universe has shown to be infinite, hence any material representation of Gabriel’s Horn can be painted since paint has a thickness.
The Plank length is the shortest possible distance between two material points. Though at that scale even vacuum is tempestuous.