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- 2010/10/25 23:54
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- It is of course one assumed space to be here.
Space … It is assumed α of space ..not seeming... Let's assume that this space α is limited. Then,
The boundary will exist in this space. This is infinity if not existing. Then, let's assume existence.
Next, the outside is sure to exist if the boundary exists. The boundary is denied, and the same ahead results in case of not being. Let's assume it is, and, next, go.
If it is ..the outside.., it is composed of this space α and the same material or it is not done or this outside becomes. If it is the former, neither the space α nor the distinction adhere, the meaning of the boundary disappears, and it becomes the latter.
Next, let's go.
Let's assume this to be able to do a space different from the space α that involves this space α to be space β.
Then, the proof of limited and infinity is repeated moreover about this space β. Then, new space and the space γ can be done again and … Moreover, it becomes it if it proves.
Then, space where the space of limited is involved cannot help be infinitely born, and, after all, admitting infinity.
In short, space is infinity.
- It is of course one assumed space to be here.
