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Title: Chain of subsets Post by tim on Oct 1st, 2002, 1:13am At first, I thought that of course it must be countable: after all, each link in the chain must add at least one element, and there are only a countable number to add. Then I started to have second thoughts. For example, if the chain counts up through all the even numbers, then all remaining multiples of three, etc. That would break the simple mapping I had in mind. Solution: Finally, I found a counterexample. It was ridiculously contorted at first, being a mapping from [0,1) into sequences of binary digits, which in turn can be broken down into a recursive function of unions of powers of primes. Then I hit a really simple one: Every real number has a Dedekind cut, the set of all rationals less than it. These sets of rationals form a chain. Rationals can be bijectively mapped with the positive integers. Therefore an uncountable chain of sets of positive integers exists. |
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Title: Re: Chain of subsets Post by Pietro K.C. on Oct 1st, 2002, 9:33am Hats off to Tim! :) Really beautiful solution. |
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