bio | website | mrcactu5.herokuapp.com/… |
---|---|---|
location | New York, NY | |
age | 30 | |
visits | member for | 5 years, 8 months |
seen | yesterday | |
stats | profile views | 4,772 |
Data Scientist @ Explorer Media. Statistics, Geometry and Physics.
Jun 30 |
revised |
Is it possible to evaluate Connect 4 positions with Combinatorial Game Theory?
more details on the reasoning behind the connect 4 strategy |
Jun 29 |
comment |
Is it possible to evaluate Connect 4 positions with Combinatorial Game Theory?
@GregMartin for one thing disjunctive sums don't make much since since that would involve moving twice in one position. perhaps in the limit of a very large board $6 \times 100$ or taller or wider. |
Jun 29 |
asked | Is it possible to evaluate Connect 4 positions with Combinatorial Game Theory? |
Jun 17 |
awarded | Favorite Question |
Jun 15 |
asked | How to realize any non-crossing matching as $\mathrm{Re}[p(z)]=0$ |
Jun 4 |
comment |
Is this differential identity known?
These steampunk identities are really great. You can prove Rodriguez formula using matrix elements of $SO(3)$. |
Jun 3 |
comment |
What are algebras for the little n-balls/n-cubes/n-something operads exactly?
the videos don't work |
Jun 3 |
comment |
Hardy spaces: analysis <---> martingales
maybe helpful arxiv.org/abs/1411.5407 |
Jun 3 |
revised |
Poisson Kernel and Triangles
added 68 characters in body |
Jun 3 |
revised |
Convolution of measures - entropy growth
attempt add some mathematical notation I belive \ast is correct since they talk about convolution |
Jun 3 |
asked | Poisson Kernel and Triangles |
May 28 |
awarded | Tumbleweed |
May 27 |
revised |
How does the solenoid structure of $\mathbb{A}/\mathbb{Q}$ lift to $PGL(2, \mathbb{A})/ PGL(2, \mathbb{Q})$?
added 172 characters in body; edited title |
May 27 |
comment |
How does the solenoid structure of $\mathbb{A}/\mathbb{Q}$ lift to $PGL(2, \mathbb{A})/ PGL(2, \mathbb{Q})$?
no I missed the part about diagonal embedding. Does it look like this? $$ \prod_{\{-1\} \cup \text{primes}}\mathrm{PGL}_2(\mathbb{Q})\backslash \mathrm{PGL}_2(\mathbb{Q}_p)$$ |
May 27 |
comment |
How does the solenoid structure of $\mathbb{A}/\mathbb{Q}$ lift to $PGL(2, \mathbb{A})/ PGL(2, \mathbb{Q})$?
@AlainValette he says that $\mathbb{Q}$ is discrete in $\mathbb{A}$ as $\mathbb{Z}$ is discrete insude $\mathbb{R}$. Can you explain how the Adeles are "separating" the rationals? OK is says it's a solenoid: $$ \mathbb{A}/\mathbb{Q} \simeq \lim_\stackrel{\longleftarrow}{N} \mathbb{R}/N\mathbb{Z}$$ This limit must hold in a suitable topology? I have no intuition what the "suitable" topology should be like, except formally. |
May 27 |
comment |
Helly's theorem in other areas of mathematics
Is Helly's selection theorem an infinite dimensional version of this? Same guy |
May 27 |
asked | How does the solenoid structure of $\mathbb{A}/\mathbb{Q}$ lift to $PGL(2, \mathbb{A})/ PGL(2, \mathbb{Q})$? |
May 21 |
revised |
mean value estimate $ \frac{1}{T} \int_0^T | \zeta( \tfrac{1}{2} + it)|^2 \, dt = \log \frac{T}{2\pi } + (2\gamma - 1) + O(T^{\delta})$
edited title |
May 21 |
asked | mean value estimate $ \frac{1}{T} \int_0^T | \zeta( \tfrac{1}{2} + it)|^2 \, dt = \log \frac{T}{2\pi } + (2\gamma - 1) + O(T^{\delta})$ |
May 15 |
comment |
Equidistribution of Hecke points and $p = (a+bi)(a-bi) = e^{i\theta}\sqrt{a^2 + b^2}$
These notes look awesome. Perhaps I should learn the basics of modular forms first. |