Michael Zhong

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Name Michael Zhong
Member for 5 months
Seen Feb 21 at 3:43
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Location CFC, Nankai University, China
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A piece of blank paper ready to be written down upon beautiful mathematics.
Jan
8
 comment Why is there a unique increasing maximal path in any Bruhat interval under any reflection order?
Thanks again! This induction can be used for the reflection order corresponding to $w_0=t_1\cdots t_k s_1\cdots s_k$(GTM 231 Exercise 5.20) when $W$ is finite. But for an arbitrary reflection ordering, I am not sure whether this reasoning still works.
Jan
3
 comment Why is there a unique increasing maximal path in any Bruhat interval under any reflection order?
Thank you very much! This is really helpful.
Dec
23
 revised Why is there a unique increasing maximal path in any Bruhat interval under any reflection order?
added 11 characters in body; edited body
Dec
22
 revised Why is there a unique increasing maximal path in any Bruhat interval under any reflection order?
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Dec
22
 awarded  Editor
Dec
22
 revised Why is there a unique increasing maximal path in any Bruhat interval under any reflection order?
added 1101 characters in body
Dec
21
 comment Are there any binomial poset which has non-isomorphic interval of the same length?
Thank you very much!
Dec
21
 awarded  Scholar
Dec
21
 awarded  Supporter
Dec
19
 awarded  Student
Dec
18
 asked Why is there a unique increasing maximal path in any Bruhat interval under any reflection order?
Dec
18
 asked Are there any binomial poset which has non-isomorphic interval of the same length?