- #1
antaris
- 9
- 3
I have a question about a mathematical problem of infinity sets.
It concerns a delicate issue, namely how infinite sets can be formalized in a manageable way.
Let us consider an infinite set (A), from which I approximate a finite region (B), that is, I more or less cut out a patch from (A) so that (B) becomes finite and I can continue working with (B). In itself, this seems to me logically completely unproblematic, since the object of interest ((B)) is finite.
My actual question, however, is how to formalize the complement of (B), i.e. (B' = A \setminus B), without running into any pitfalls related to infinity. It is completely unclear to me how infinity in this example can be understood formally.
I have read a little about complement systems/families and limiting procedures, since that seemed like a natural direction to me, but I am far from sure which lever I actually need to pull, or whether the problem can even be reduced to a single lever at all.
I would therefore be very grateful if someone could point me in the right direction, for example by suggesting primary sources or offering an explanation.
Thanks in advance!
It concerns a delicate issue, namely how infinite sets can be formalized in a manageable way.
Let us consider an infinite set (A), from which I approximate a finite region (B), that is, I more or less cut out a patch from (A) so that (B) becomes finite and I can continue working with (B). In itself, this seems to me logically completely unproblematic, since the object of interest ((B)) is finite.
My actual question, however, is how to formalize the complement of (B), i.e. (B' = A \setminus B), without running into any pitfalls related to infinity. It is completely unclear to me how infinity in this example can be understood formally.
I have read a little about complement systems/families and limiting procedures, since that seemed like a natural direction to me, but I am far from sure which lever I actually need to pull, or whether the problem can even be reduced to a single lever at all.
I would therefore be very grateful if someone could point me in the right direction, for example by suggesting primary sources or offering an explanation.
Thanks in advance!