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現代数学の系譜工学物理雑談古典ガロア理論も読む76

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>>352
> >>348-349
> >君が「６コ中の最大値である確率は、1/6」と思ったんだよね
> 
> 思ってないよ
> だって、「サイコロに勝手な自然数６コを記載する」（>>346）
> だから、n1,n2,n3,n4,n5,n6∈N（自然数）でしょ？
> 確率空間書いて、積分してみなよ
> それって、N（自然数）全体で、各n1,n2,n3,n4,n5,n6達に、測度1を与える話でしょ？ 積分（実は和）は∞に発散するだろ？ｗ（＾＾
> 
> で、あなたの考えは
> 下記Denis "I think it is ok, because the only probability measure we need is uniform probability on {0,1,…,N-1}"
> と同じでしょ？（＾＾（>>287ご参照）
> で、厳密な数学の証明がないというのが、Pruss氏、確率論の専門家さんと、私ね（＾＾
> 
> (>>241)
> そこを（数学的に厳密でないと）批判しているのが、Alexander Pruss氏だよ
> https://mathoverflow.net/questions/151286/probabilities-in-a-riddle-involving-axiom-of-choice
> Probabilities in a riddle involving axiom of choice Dec 9 '13
> (抜粋)
> asked Dec 9 '13 at 16:16 Denis
> I think it is ok, because the only probability measure we need is uniform probability on {0,1,…,N-1}, but other people argue it's not ok, because we would need to define a measure on sequences, and moreover axiom of choice messes everything up.
> 
> Alexander Pruss answered
> The probabilistic reasoning depends on a conglomerability assumption, namely that given a fixed sequence u￣ , the probability of guessing correctly is (n?1)/n, then for a randomly selected sequence, the probability of guessing correctly is (n?1)/n.
> But we have no reason to think the event of guessing correctly is measurable with respect to the probability measure induced by the random choice of sequence and index i, and we have no reason to think that the conglomerability assumption is appropriate.
> 
> A quick way to see that the conglomerability assumption is going to be dubious is to consider the analogy of the Brown-Freiling argument against the Continuum Hypothesis (see here for a discussion).
> http://www.mdpi.com/2073-8994/3/3/636

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