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visits | member for | 1 year, 6 months |
seen | Mar 28 '13 at 14:09 | |
stats | profile views | 159 |
Mar 28 |
revised |
Maximal chain of 1s in binary strings
added 46 characters in body |
Mar 28 |
comment |
Maximal chain of 1s in binary strings
@ Noah Stein. "the" upper bound is O(1), O(log n), O(\sqrt(n)) or O(n)... We do not need the exact value of F(n). |
Mar 28 |
comment |
Maximal chain of 1s in binary strings
And thank for your useful suggestion, Nadeau. :) |
Mar 28 |
revised |
Maximal chain of 1s in binary strings
edited body |
Mar 28 |
comment |
Maximal chain of 1s in binary strings
I'm sorry, this is a typo. Yeah, it is 2^n at the denominator |
Mar 28 |
asked | Maximal chain of 1s in binary strings |
Feb 17 |
comment |
Combinatorial Inequality
It seems to me that $\frac{\sum a_{ij}}{2^n}=O(\log n)$. Is it correct? |
Feb 17 |
accepted | Combinatorial Inequality |
Feb 15 |
asked | Combinatorial Inequality |
Nov 5 |
comment |
On the paper “On the asymptotic linearity of Castelnuovo-Mumford regularity”
@Graham Leuschke : Thanks ! |
Nov 5 |
comment |
On the paper “On the asymptotic linearity of Castelnuovo-Mumford regularity”
@William Sawin : Thanks. I really appreciate that. What about the other questions ? |
Nov 3 |
asked | On the paper “On the asymptotic linearity of Castelnuovo-Mumford regularity” |
Oct 24 |
accepted | Filter-regular sequence and regularity |
Oct 23 |
revised |
Filter-regular sequence and regularity
edited body |
Oct 23 |
asked | Filter-regular sequence and regularity |
Oct 16 |
comment |
Question on bigraded modules
@Ralph: Thank you very much for answering my question. May I ask : Why in $(*)$ the component containging the variables $T1,...T_s$ disappear? |
Oct 15 |
revised |
Question on bigraded modules
edited body |
Oct 15 |
comment |
Question on bigraded modules
@Ralph: You are right. In fact, I proved it but I am not sure about it, the graded structure confuses me. |
Oct 15 |
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On the generator of power of ideal
@Neil Epstein : What will happen if I is a monomial ideal ? |
Oct 15 |
comment |
Question on bigraded modules
@Ralph: Thank you, I have confused with $R$ and $S$. The 2nd question is in fact a results of a lemma in a paper, that I do not think it is trivial but I have not proved it yet, so I decided to post it here. Thank you very much! P.s : The functor is from the category of bigraded modules to the category of bigraded module, I think. |