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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 
Maximal connected topologies
What are the other properties of this space? 
1d

comment 
Proof that no differentiable spacefilling curve exists
How research question was it? :) 
1d

comment 
Proof that no differentiable spacefilling curve exists
Such spaces (curves) are a countable union of subspaces homeomorphic to a closed interval. Thus these spaces must be 1dimensional (or, to use a different argument, they are small in the sense of Baire categories). 
Mar 28 
comment 
Connectedness in the language of pathconnectedness
This $\ C\ $ works only for a given in advance family of connected spaces, and there is no any sharp upper bound on the size of $\ C.\ $ Thus I fail to see this construction as cool or very nice. On the contrary, it is routine, and it doesn't buy much. 
Mar 28 
revised 
Connectedness in the language of pathconnectedness
covering dimention of S_A 
Mar 28 
revised 
Connectedness in the language of pathconnectedness
cosmetic 
Mar 28 
revised 
Connectedness in the language of pathconnectedness
fixing trivialities. Not finished(?) 
Mar 28 
revised 
Connectedness in the language of pathconnectedness
fixing trivialities. Not finished(?) 
Mar 28 
revised 
Connectedness in the language of pathconnectedness
fixing trivialities. Not finished(?) 
Mar 28 
revised 
Connectedness in the language of pathconnectedness
off term 
Mar 27 
revised 
Connectedness in the language of pathconnectedness
EXTRA 
Mar 27 
revised 
Connectedness in the language of pathconnectedness
the missing argumentconnectedness 
Mar 27 
revised 
Connectedness in the language of pathconnectedness
cosmetic 
Mar 27 
answered  Connectedness in the language of pathconnectedness 
Mar 27 
comment 
A relative version of Urysohn's Lemma?
Oh, you mean that this is a single question, not two independent questions. Sorry. 
Mar 27 
comment 
A relative version of Urysohn's Lemma?
When $Y$ is normal, and $s(X)$ is closed in $Y$ then there kis a Urysohn function $f:Y\rightarrow[0;1]$ such that $fs(X)=1$, and $fY\setminus U=0$ (am I missing something?). 
Mar 26 
comment 
A relative version of Urysohn's Lemma?
The second question is instantly true when $\ Y\ $ is normal (right?), so that it is nontrivialpossibly difficultfor nonnormal Y (which feel a bit weird). 
Mar 24 
comment 
reflexive banach space
Thank you. Now, it's easier to find it and possibly make a reference to it within MO. 
Mar 24 
comment 
reflexive banach space
Alpx, are you calling me "this nonexpert". OK, it's true. The question is interesting but too vague. @BillJohnson 's answer is great. I'd like to see it as THE ANSWER (are there some other "THE ANSERWs"? Then let them see them too). 
Mar 21 
comment 
Harmonic function, inversion
What is the definition of the factorial harmonius! ? 