18 Apr
2005
18 Apr
'05
7:24 p.m.
Dan Asimov wrote:
<< Can someone give me an example of a set of density 1/2 on every interval of the real numbers?
If such a set must be measurable, then no such set exists.
On the other hand, there do exist partitions of the reals into two dense homogeneous subsets that are related by a translation.
Probably I should know why both of these are true, but right now it seems that I don't. Can you explain? --Michael Kleber ps: "all reals whose last digit is even" :-? -- It is very dark and after 2000. If you continue you are likely to be eaten by a bleen.