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FillMaths

186 カルマ登録 4 年前

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Zeno's Paradox and Infinite Sums – Lectures on Infinity (Lecture 1) [video]

youtube.com
2 ポイント·投稿者 FillMaths·5 日前·0 コメント

Humans Are Not Conscious

philosophersmag.com
4 ポイント·投稿者 FillMaths·13 日前·0 コメント

Fermat's last theorem in the natural ring of ordinals

infinitelymore.xyz
3 ポイント·投稿者 FillMaths·先月·0 コメント

Joel David Hamkins – Set Theory, Pluralism and the Multiverse View – About Logic

youtube.com
3 ポイント·投稿者 FillMaths·先月·0 コメント

Skolem's Paradox

infinitelymore.xyz
1 ポイント·投稿者 FillMaths·先月·0 コメント

The Book of Numbers

infinitelymore.xyz
4 ポイント·投稿者 FillMaths·2 か月前·0 コメント

Mathematicians disagree on the essential structure of the complex numbers (2024)

infinitelymore.xyz
246 ポイント·投稿者 FillMaths·5 か月前·377 コメント

Ultrafinitism

infinitelymore.xyz
2 ポイント·投稿者 FillMaths·7 か月前·0 コメント

The Infinite Subway Paradox

infinitelymore.xyz
3 ポイント·投稿者 FillMaths·10 か月前·1 コメント

The Liar (A Logic Song)

youtube.com
2 ポイント·投稿者 FillMaths·昨年·0 コメント

How the continuum hypothesis could have been a fundamental axiom

youtube.com
2 ポイント·投稿者 FillMaths·昨年·0 コメント

How we might have viewed the continuum hypothesis as a fundamental axiom

youtube.com
2 ポイント·投稿者 FillMaths·昨年·0 コメント

Take my Infinity final exam

infinitelymore.xyz
1 ポイント·投稿者 FillMaths·2 年前·0 コメント

How do you think of the complex numbers? (poll)

twitter.com
1 ポイント·投稿者 FillMaths·2 年前·1 コメント

Recursive Chess

infinitelymore.xyz
3 ポイント·投稿者 FillMaths·2 年前·0 コメント

We Can Predict the Future

infinitelymore.xyz
1 ポイント·投稿者 FillMaths·2 年前·0 コメント

How the continuum hypothesis could have been a fundamental axiom

jdh.hamkins.org
72 ポイント·投稿者 FillMaths·2 年前·48 コメント

Did Turing prove the undecidability of the halting problem?

jdh.hamkins.org
1 ポイント·投稿者 FillMaths·2 年前·2 コメント

Are the Imaginary Numbers Real?

infinitelymore.xyz
3 ポイント·投稿者 FillMaths·2 年前·3 コメント

What are the real numbers, really? (And what should they be?)

infinitelymore.xyz
1 ポイント·投稿者 FillMaths·2 年前·0 コメント

コメント

FillMaths
·5 か月前·議論
The real field is categorically characterized (in second-order logic) as the unique complete ordered field, proved by Huntington in 1903. The complex field is categorically characterized as the unique algebraic closure of the real field, and also as the unique algebraically closed field of characteristic 0 and size continuum. I believe that you are speaking of the model-theoretic first-order notion of categoricity-in-a-cardinal, which is different than the categoricity remarks made in the essay.
FillMaths
·5 か月前·議論
It's not about observers, but about mathematical structure and meaning. Without answering the questions, you are being ambiguous as to what the structure of C is. For example, if a particular copy of R is fixed as a subfield, then there are only two automorphisms---the trivial automorphism and complex conjugation, since any automorphism fixing the copy of R would have to be the identity on those reals and thus the rest of it is determined by whether i is fixed or sent to -i. Meanwhile, if you don't fix a particular R subfield, then there is a vast space of further wild automorphisms. So this choice of structure---that is, the answer to the questions I posed---has huge consequences on the automorphism group of your conception. You can't just ignore it and refuse to say what the structure is.
FillMaths
·5 か月前·議論
Of course everyone agrees that this is a nice way to construct the complex field. The question is what is the structure you are placing on this construction. Is it just a field? Do you intend to fix R as a distinguished subfield? After all, there are many different copies of R in C, if one has only the field structure. Is i named as a constant, as it seems to be in the construction when you form the polynomials in the symbol i. Do you intend to view this as a topological space? Those further questions is what the discussion is about.
FillMaths
·5 か月前·議論
You say that i is "the square root of -1", but which one is it? There are two. This is the point in the essay---we cannot tell the difference between i and -i unless we have already agreed on a choice of which square root of -1 we are going to call i. Only then does the other one become -i. How do we know that my i is the same as your i rather than your -i?

To fix the coordinate structure of the complex numbers (a,b) is in effect to have made a choice of a particular i, and this is one of the perspectives discussed in the essay. But it is not the only perspective, since with that perspective complex conjugation should not count as an automorphism, as it doesn't respect the choice of i.
FillMaths
·5 か月前·議論
This one has the paywall, but the main site has no paywall currently.
FillMaths
·10 か月前·議論
Subsequent posts developing the paradox further into the transfinite ordinals and uncountable ordinals: https://www.infinitelymore.xyz/t/infinite-subway-paradox
FillMaths
·2 年前·議論
Sorry, I tried my best. I wanted to mention the thought experiment part, since that is the most interesting bit. (But I'm not sure why it was misleading?)
FillMaths
·2 年前·議論
The pdf file is available at: https://arxiv.org/pdf/2407.02463
FillMaths
·2 年前·議論
That's similar to what the author says in the second paragraph. But he goes on to consider many other subtle notions arising from the fact that the complex field is not rigid. How can we tell i from -i? They have all the same properties with respect to the field structure.