Mathematics - 2019-12-12 (page 3 of 3)

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Akiva Weinberger

6:11 PM

Another question

If $x$ is a quadratic irrational, what can be said about the sequence $\lfloor x^n\rfloor\mod2$

Are there any specific values of $x$ where this sequence is particularly simple

What sequences are possible

Leaky Nun

yeah like $(1+\sqrt 2)$

Akiva Weinberger

Why

Leaky Nun

@AkivaWeinberger desmos.com/calculator/5vi3frr7z0

close to integer

because its conjugate $(1-\sqrt 2)$ has norm < 1

so its powers go to 0

Akiva Weinberger

Yeah it's a Pisot number right

Leaky Nun

who?

Soham Chowdhury

6:34 PM

Pisot–Vijayaraghavan number

In mathematics, a Pisot–Vijayaraghavan number, also called simply a Pisot number or a PV number, is a real algebraic integer greater than 1 all of whose Galois conjugates are less than 1 in absolute value. These numbers were discovered by Axel Thue in 1912 and rediscovered by G. H. Hardy in 1919 within the context of diophantine approximation. They became widely known after the publication of Charles Pisot's dissertation in 1938. They also occur in the uniqueness problem for Fourier series. Tirukkannapuram Vijayaraghavan and Raphael Salem continued their study in the 1940s. Salem numbers are a...

neat

Semiclassical

7:06 PM

@AkivaWeinberger I may go and create a Mathematica visualization for this

Akiva Weinberger

Oh hey @Soham long time no see

Semiclassical

basically, I'd need to put together code that would take the n vertices of a convex polygon (in their order along the edge) and produce the 2n new vertices at the thirds

Shouldn't be so difficult.

Soham Chowdhury

@AkivaWeinberger hey

NoName

7:28 PM

How do you type $\triangleright$ but filled-out in $\LaTeX$?

ÍgjøgnumMeg

$\blacktriangleright$

\blacktriangleright

NoName

Thanks.

sevdaicmis

good evening all

sevdaicmis

8:08 PM

is there any friends interested in fountain pens here? papers, inks etc.

Ted E

I am, but I haven't had enough wealth yet to build a collection.

sevdaicmis

8:26 PM

me neither, i've only an introductory pen that i'm using to take my lecture notes

sevdaicmis

8:37 PM

it's a moonman m2, an eyedropper pen which can contain lots of ink at a time

which therefore is suitable for taking notes for long periods of time

Ted Shifrin

9:17 PM

I've owned a Parker 51, which I continue to use daily, for almost 60 years.

sevdaicmis

wow, impressive. is there any specific paper you use with?

Ted Shifrin

No. It isn't that snobbish :P

The barrel got cracked a few times and I'd glued it together. Back in the 1980s sometime, I sent it to Parker to be repaired, and they gave me a new barrel and new ink bladder for free!! Great customer service.

Mike Miller

10:03 PM

Conway's book is fine, though I would probably use something else for a first go at complex analysis. Volume 2 contains some interesting results.

I think the classification of multiply connected domains (pi_1 finitely generated) up to biholomorphism is done there.

1 hour later…

Leaky Nun

11:07 PM

@TedShifrin does the boundary operator in the cohomology Mayer--Vietoris sequence satisfy the product rule?

Shine On You Crazy Diamond

11:20 PM

@Ultra wanna study?

Ultradark

@shi

what time are you available until?

Shine On You Crazy Diamond

Wanna study some Dummit & Foote

forever

Can we just study now?

Ultradark

yeah how about from now until 7?

Shine On You Crazy Diamond

Sure

Open the D&F book I sent

Come to chat room

Check what page you want to start on

should only take a minute

You likely know a bunch of the intro already

Are you there?

@Ultradark

Ultradark

yep

Shine On You Crazy Diamond

11:24 PM

K, so what page

And also create a chat room

Ted E

@anakhro French is just a typesetting choice for math

Shine On You Crazy Diamond

>_<

Ultradark

@shi I'm in the chat room already

genescuba

11:38 PM

Im trying to understand stoke's and gauss' theorem and am looking at math.stackexchange.com/questions/47861/…

"Stokes' Theorem says that if 𝐅(𝑥,𝑦,𝑧) is a vector field on a 2-dimensional surface 𝑆 (which lies in 3-dimensional space), then"

$ \iint_{S} \operatorname{curl} \mathbf{F} \cdot d \mathbf{S}=\oint_{\partial S} \mathbf{F} \cdot d \mathbf{r} $

Why does a 2-dimensional surface lie in 3 dimensional space

Im a bit confused on this concept, can anyone explain this

Astyx

11:59 PM

If you look at the 3D-sphere, like the earth, it's a 2-dimensional surface because if you stand on it, it looks flat like $\Bbb R^2$ even though it's in a 3 dimensional space