Revision 1e11baa1-f1f7-43c4-8486-eb5fa906ac5d

Let $X$ be the underlying space of a scheme. 

 - If $X$ is irreducible of finite Krull dimension, is it necessarily
   quasi-compact? 
 - Is it necessarily Noetherian?
 - What if we assume not
   only that Krull dimension is finite but also that it is 1?