I have someone who is begging for a conversation with me about infinity. He thinks that Cantor got it wrong, and suggested to me that Gauss did not really believe in infinity, and would not have tolerated any hierarchy of infinities.
I can see that a constructivist approach could insist on avoiding infinity, and deal only with numbers we can name using finite strings, and proofs likewise. But does anyone have any knowledge of what Gauss said or thought about infinity, and particularly whether there might be any justification for my interlocutor's allegation?
Best Answer
Here is a blog post from R J Lipton which throws some light on this question. Quoting from a letter by Gauss:
The blog gives this translation: