bio  website  

location  sqrt(1)  
age  
visits  member for  4 years, 8 months 
seen  1 hour ago  
stats  profile views  3,605 
two queens
mathematics and death
not cheerful not sad
guide me through the land
pat me on my head
they live
in my one man nation
i follow them
to my destination
wh,
(long ago)
polynomials over finite Galois field
spread so evenly across their finite affine space
i wish for a network of friends
to count on
wh,
19960305/06
1d

comment 
Are all minimal totally separated spaces compact?
Dominic, in your two recent posts (Questions, including this one) you are using your own definition of the 0dimensional space which drastically contradicts the well established classical topological terminology. You should add a triple X rating so that mathematicians under 18 will not be exposed to it. Other people could go on, they worked on your questionsI couldn't. Regards. 
1d

comment 
Fixed point theorems
@ToddTrimble  thank you. 
Apr 14 
comment 
2, 3, and 4 (a possible fixed point result ?)
@Dirk  thank you. 
Apr 14 
comment 
2, 3, and 4 (a possible fixed point result ?)
What are the related known results? 
Apr 14 
comment 
Fixed point theorems
What is the question? 
Apr 13 
comment 
Snakelike continua and universal images
@MathieuBaillif  very well said! Thank you Mathieu. 
Apr 13 
comment 
Snakelike continua and universal images
@DavidWhite  I misunderstood of what you said. I thought that you were objecting to the gray field, not to what was under the gray field, i.e. that you didn't like the subtitle "D E F I N I T I O N(s)" itself. 
Apr 13 
revised 
Snakelike continua and universal images
TeX typo 
Apr 13 
comment 
Snakelike continua and universal images
@GabrielC.DrummondCole  your edit is fine, thank you. Your format is more pleasing to an eye, especially due to the existing standards. My format allows to see the sense faster (granted that you do not feel shocked by its being optically irregular, that you let it be). It's like x++ to a Pascal programmer who is used to x:=x+1. 
Apr 13 
comment 
Snakelike continua and universal images
@DominicvanderZypen  when $\ Y\ $ is snakewise (etc) then the respective $\ p\ $ exists. Thus it is vital for the question to ask about spaces $\ Y\ $ which are not snakelike continua. 
Apr 13 
comment 
Snakelike continua and universal images
Confused?? There are no special rules about the contents of the gray fields that I know of. 
Apr 13 
revised 
Snakelike continua and universal images
clearer? 
Apr 12 
awarded  Convention 
Apr 12 
comment 
Finite distributive lattices not contained in $\omega^\omega$
Bjørn, that's why I said just :) 
Apr 12 
comment 
Finite distributive lattices not contained in $\omega^\omega$
Bjørn, I think that you essentially said what Richard said just before you. Anyway, the theorem about representation of distributive lattices as lattices of sets, with their settheoretic operations, is as classical as possible. The embedding is an instant corollary. 
Apr 11 
asked  Snakelike continua and universal images 
Apr 10 
comment 
Open problems in Euclidean geometry?
Of course. I just wanted the problem to be stated cleanly, without readers stopping over trivial nonessential elements, even if only for a moment. 
Apr 10 
comment 
Open problems in Euclidean geometry?
No three points on a line? 
Apr 9 
comment 
Topological properties for which bijectively related imply homeomorphism
However, indeed, @ToddTrimble's link to Dominic's question leads to the excellent answer there by Jack Porter. 
Apr 9 
comment 
Topological properties for which bijectively related imply homeomorphism
It is a wide spread practice on MO to make references to MO where half of the time a standard source would be more instructive. In the given case mentioning for example Bourbaki or Engelking would lead to more info (and more complete) than an MO question. True, it's more convenient to click on MO. 