bio | website | maths.bris.ac.uk/~mahah |
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location | ||
age | ||
visits | member for | 5 years, 7 months |
seen | May 23 at 18:23 | |
stats | profile views | 4,230 |
Apr 20 |
awarded | Nice Question |
Apr 16 |
comment |
A variant of Goldbach Conjecture
It can, but it could be a little tricky - most of the weights I use are not compactly supported (though they decay very fast -- they are almost supported on a compact interval). |
Apr 15 |
awarded | Good Answer |
Apr 15 |
awarded | Mortarboard |
Apr 15 |
awarded | Nice Answer |
Apr 15 |
comment |
A variant of Goldbach Conjecture
It would, but that's hard. See terrytao.wordpress.com/2012/05/20/… |
Apr 15 |
answered | A variant of Goldbach Conjecture |
Feb 4 |
comment |
Packing bounds for sumsets, or, very discrete balls
Excuse my ignorance - is the rate for a linear code with minimum distance $n/3$ bounded from below by a positive constant? |
Feb 4 |
comment |
Packing bounds for sumsets, or, very discrete balls
Heehee. Sure. Answer it in $\mathbb{F}_3^n$ if you prefer. |
Feb 4 |
asked | Packing bounds for sumsets, or, very discrete balls |
Dec 18 |
awarded | Nice Question |
Oct 15 |
awarded | Yearling |
Oct 13 |
awarded | Custodian |
Oct 13 |
reviewed | Approve books on very large scale linear optimization |
Sep 24 |
revised |
Images of the fundamental domain of $\text{SL}_2(\mathbb{Z})\backslash \mathbb{H}$ whose Euclidean area is large
added 14 characters in body |
Sep 24 |
answered | Images of the fundamental domain of $\text{SL}_2(\mathbb{Z})\backslash \mathbb{H}$ whose Euclidean area is large |
Sep 23 |
comment |
Images of the fundamental domain of $\text{SL}_2(\mathbb{Z})\backslash \mathbb{H}$ whose Euclidean area is large
HJRW - this (= going over a ball in the Cayley graph) is actually how I am producing drafts of posters right now. I still think it would be nice to know a priori how far one needs to go. |
Sep 23 |
comment |
Images of the fundamental domain of $\text{SL}_2(\mathbb{Z})\backslash \mathbb{H}$ whose Euclidean area is large
Well, one can take care of the region $\Re(y)>1$ in the obvious way, and then apply a Monte Carlo method like this one to the rest. Still, this isn't really that satisfying. |
Sep 22 |
comment |
Images of the fundamental domain of $\text{SL}_2(\mathbb{Z})\backslash \mathbb{H}$ whose Euclidean area is large
This is a good idea, but I'd still like to have an explicit bound. $2 A(S)/\epsilon$ (where $A(S)$ is presumably the Euclidean area of $S$) can be pretty large. |
Sep 22 |
comment |
Images of the fundamental domain of $\text{SL}_2(\mathbb{Z})\backslash \mathbb{H}$ whose Euclidean area is large
In the case of a box $\lbrack 0,N\rbrack \times \lbrack 0,N\rbrack$ (a good example, actually), the hyperbolic area of $S$ is $\infty$, yet the question still makes sense. So, you really have to know what $S$ is. (And as I said, you may assume it is a box.) |