Math for Non-Geeks/The infinite case

{{#invoke:Math for Non-Geeks/Seite|oben}} In order for a set to have a supremum, it must be bounded from above. If it is unbounded, then there is a "formal supremum of ${\displaystyle \mathrm{\infty }}$". Here, we will define what this means exactly. In addition, we will assign a supremum/ infimum to the empty set.

A set ${\displaystyle M}$ is unbounded from above if it has no upper bound. Than means, every ${\displaystyle S\in ℝ}$ must not be an upper bound, so there is an element ${\displaystyle x\in M}$ with ${\displaystyle x>S}$. That's already the mathematical definition:

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In that case, the upper bound of ${\displaystyle M}$ is formally ${\displaystyle \mathrm{\infty }}$, since for every element ${\displaystyle x\in m}$ there is ${\displaystyle x<\mathrm{\infty }}$. We hence write

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Attention! The symbol ${\displaystyle \mathrm{\infty }}$ does not define a real number. So ${\displaystyle \sup M=\mathrm{\infty }}$ is not a supremum of ${\displaystyle M}$. Instead it is an improper supremum. Mathematicians spent some considerable effort into defining the object ${\displaystyle \mathrm{\infty }}$ as a number. Their conclusion was that this cannot be done in a meaningful way: treating ${\displaystyle \mathrm{\infty }}$ as a number would violate axioms of how to compute with numbers. For instance, we could try to define ${\displaystyle 3+\mathrm{\infty }}$. Intuitively, taking 3 and adding an infinite amount to it, we again get an infinite amount. So only ${\displaystyle 3+\mathrm{\infty }=\mathrm{\infty }}$ makes sense. but subtracting ${\displaystyle \mathrm{\infty }}$ from both sides gives us ${\displaystyle 3=0}$, which is plainly wrong! If you've got some time, you can play a bit with infinities in your head, trying to treat them as numbers. The result will be a lot of contradictions like ${\displaystyle 3=0}$ or ${\displaystyle 1=2}$. This is certainly the best way to convince yourself not to treat ${\displaystyle \mathrm{\infty }}$ as a real number ;)

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Analogously for sets unbounded from below:

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The empty set does also not really have a supremum or infimum: We consider ${\displaystyle M=\mathrm{\varnothing }}$, then a supremum would formally be the smallest upper bound.

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Following the answers to the 2 questions above, it makes sense to define

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Again, be cautious: This is not a real number! The set ${\displaystyle \mathrm{\varnothing }}$ has no supremum, but an improper supremum, instead. And the same holds for the infimum. Always keep proper and improper suprema/ infima strictly apart!

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