I have found an answer (I think) thanks to the previous answer, but I'm not sure it's correct. Take \mathbb{R} as a \mathbb{Q}-vectorspace, with the euclidean topology. Suppose we have a \mathbb{Q} ...

Well, you've got a p sneaking in where you want n. Then there are two parts to the argument based on whether d = \gcd(m,n) is 1 or more than 1. If d > 1, then you get a zero divisor ...

Two square matrices over a field F have the same rational canonical form . The rational canonical form always has entries in the same field F. Therefore if A and B are similar over the ...

Your answer 3 is correct. You just need to prove the statement If f only moves finitely many numbers, then f^{-1} moves finitely many numbers. This should be easy to see because if f(x) = x, ...

E.g. if E is the set of irrationals in the reals (which is residual), we can take r_p =|p| for all irrational p and then 0 \notin \hat{E} for that those radii. So there is no general ...

We work with the domain \mathbb{R}, define f_n (x) = \chi_{[0,n)}(x) we have f_n \rightarrow \chi_{[0,\infty)}(x) pointwise a.e. and \{f_n\} is uniformly integrable. But \chi_{[0,\infty)}(x) ...