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William Oliver
William Oliver
04:00
I also can't tell if I do actually get it, but there is just a communication barrier between me and everyone who really understands it
Leaky Nun
Leaky Nun
04:30
2 hours ago, by Ted Shifrin
Tensor product is not a map.
@WilliamOliver kindly follow this
47 mins ago, by 0celo7
@WilliamOliver honestly unless you're trying to be very algebraic just think of tensors as multilinear maps
so this is wrong
William Oliver
William Oliver
Whats the difference between a map and an operation
Leaky Nun
Leaky Nun
the name
@WilliamOliver it makes multilinear maps into linear maps
William Oliver
William Oliver
Okay so, I found something, a few lines down from en.wikipedia.org/wiki/… here it says that it is an operation
A bilinear one
that takes two vector spaces to the tensor product space
"This product operation $ \otimes :V\times W\rightarrow V\otimes W$ is quickly verified to be bilinear.
Leaky Nun
Leaky Nun
1 min ago, by William Oliver
Okay so, I found something, a few lines down from https://en.wikipedia.org/wiki/Tensor_product#Tensor_product_of_vector_spaces here it says that it is an operation
no, it doesn't
ok
William Oliver
William Oliver
Then what does that quote mean
Leaky Nun
Leaky Nun
04:35
you're confusing the process of generating the product and the object itself that we call the tensor product
also, the quote is talking about the small tensor symbol
i.e. $v \otimes w$
William Oliver
William Oliver
Right
Leaky Nun
Leaky Nun
it does not say that $V \otimes W$ is an operation
William Oliver
William Oliver
Oh right okay
I think I am just having communication issues
I just communicate poorly
I think I fully understand now
Leaky Nun
Leaky Nun
ok
William Oliver
William Oliver
Although, actually, I think it is still a bilinear operation right. If we take a vector space to itself be a vector in the vector space of vector spaces with the operation $\oplus$
But that is irrelevant
0celo7
0celo7
04:41
@LeakyNun ted's statement and mine are not incompatible
@WilliamOliver read Chapter 12 of Lee's smooth manifolds if you can get it
pages 305 - 307
Daminark
Daminark
That's a rather short chapter
Leaky Nun
Leaky Nun
@Daminark o.O
0celo7
0celo7
@Daminark that's the part he needs
Leaky Nun
Leaky Nun
>.>
Secret
Secret
[Random]
(The following message is delayed)
0celo7
0celo7
04:49
@WilliamOliver and then go to 311
there's really no need for free vector spaces or the universal property
William Oliver
William Oliver
@0celo7 Thanks!
Clarinetist
Clarinetist
@MichaelHardy I'm back on. Thanks for pinging me
I'm going to open up a room
@MichaelHardy Please see chat.stackexchange.com/rooms/72526/…
WDUK
WDUK
05:42
Any one about ? Need some help with an integral
ManishKumar Singh
ManishKumar Singh
Hi, how would you prove $\int_{0}^{2\pi} u(e^{i\theta}(x+iy)) sin(\theta)d\theta$ is a polynomial if $u$ is harmonic
polynomila in indeterminates x,y
 
2 hours later…
Secret
Secret
07:41
@Daminark That is what happens when I wrote some of my proofs in my linear algebra course back in the past
Secret
Secret
[Random]
Annelise t.
Annelise t.
Hello, I have a yes or no question:) Does this set $S=\{x:x_1+2x_2\le 4\}$ has extreme points?
Tobias Kildetoft
Tobias Kildetoft
There, I made a plot of the grades given as determined by my own scores and after meeting with the external evaluator. For a large enough sample size, the grading scale was designed so that it should be normally distributed with an average of 7
It is not quite like that here imgur.com/a/bjYQd
Daminark
Daminark
Huh
Secret
Secret
3
Q: Why, in terms of the structure of proofs and proof strategy, is this proof of mine said to be backwards in logic?

SecretLast year when I was doing the linear algebra and proof writing course, I was often said by my friends and my professors that the logical flow of my proofs are weird or even backwards. Recently, I accidentally stumbled upon this site. After analysing it and comparing with the standard approaches...

proof-writing terminology
Daminark: for example here
I unawarely (mis)proved the converse instead of the intended
Vrouvrou
Vrouvrou
07:55
hello
`someone know this theorem
Let $u\in L^1_{loc}(\Omega)$ such that $$\int_{\Omega} u(x)\xi(x) dx=0,~\xi\in C_0(\Omega).$$ Then, $$u\equiv0~\text{a.e. in}~ \Omega.$$
Tobias Kildetoft
Tobias Kildetoft
Just got a Google Scholar update, because apparently the place I uploaded my lecture notes for representation theory is indexed there.
Vrouvrou
Vrouvrou
?
what i must surch ?
Tobias Kildetoft
Tobias Kildetoft
@Vrouvrou depends on what you want to find
Vrouvrou
Vrouvrou
this theorem:
Let $u\in L^1_{loc}(\Omega)$ such that $$\int_{\Omega} u(x)\xi(x) dx=0,~\xi\in C_0(\Omega).$$ Then, $$u\equiv0~\text{a.e. in}~ \Omega.$$
i founded in a thesis as the " Du Bois Reymond"
Secret
Secret
Tobias, vrou. It seems to be a L^1 special case of this:
11
Q: Integral vanishes on all intervals implies the function is a.e. zero

rondo9I am having trouble with the following problem: $f:\mathbb{R}\to \mathbb{R}$ is a measurable function such that for all $a$: $$\int_{[0,a]}f\,dm=0.$$ Prove that $f=0$ for $m$ almost every $x$ (here $m$ is the Lebesgue measure). I have no problem proving this for $f$ non-negative, or u...

real-analysis measure-theory lebesgue-integral
Vrouvrou
Vrouvrou
08:10
@Secret but in the version i have $\xi$ under the integral
Secret
Secret
$\xi$ has something to do with the integration region, I suspect it might be a measure or something
I recall seeing something similar in my electrodynamics 3rd year undergrad crouse, but they have gave no name
Vrouvrou
Vrouvrou
$\xi\in C_0$
Secret
Secret
08:27
user image
@Anneliset. I think no as every point in $S$ can be covered by open line segments that are parallel to x+2y=4
Secret
Secret
physicsforums.com/threads/…
vrou: all similar looking theorems don't seemed to have a name
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[Random]
Vrouvrou
Vrouvrou
there is no book where i can found it ?
Secret
Secret
I have no idea, but that results (and its relatives) are often tied to measure zero functions, so I guess some books on lebesgue integration and measure theory might have it, though I strongly doubt it even has a name
Vrouvrou
Vrouvrou
ok thank you
Secret
Secret
[Random]
â‘ 
\begin{align}
\textbf{x}+\textbf{0} & = \textbf{x}\\
\textbf{x}1 & = \textbf{x}\\
a(b\textbf{x}) & = (ab)\textbf{x}\\
(\textbf{x}+ \textbf{y}) + \textbf{z} & = \textbf{x} + (\textbf{y} + \textbf{z})\\
\textbf{x}+ \textbf{y} & = \textbf{y} + \textbf{x}\\
\textbf{x}+ (-\textbf{x}) & = \textbf{0}\\
a(\textbf{x}+ \textbf{y}) & = a\textbf{x}+ a\textbf{y}\\
(a + b)\textbf{x} & = a\textbf{x}+ b\textbf{x}\\
\end{align}
â‘¡
\begin{align}
\textbf{x} : V \mapsto V^*\\
\tilde{w} : V^* \mapsto V\\
\end{align}
â‘¢
\begin{align}
\text{f}_i \in\mathcal{B}\\
\text{v} & = \sum_{i \in I} a_i\textbf{f}^i\\
\text{g}_i \in\mathcal{B}\\
\tilde{w} & = \sum_{i \in J} b^i\textbf{g}_i
\end{align}
typo
â‘¡
\begin{align}
\textbf{x} : V \mapsto \Bbb{F}\\
\tilde{w} : V^* \mapsto \Bbb{F}\\
\end{align}
o great ths is all wrong
going to do this in one go to prevent flooding
 
2 hours later…
Mithlesh Upadhyay
Mithlesh Upadhyay
10:48
1
Q: $G’$ be the graph constructed by squaring the weights of edges in $G$

Mithlesh UpadhyayLet $G$ be a weighted graph with edge weights greater than one and $G’$ be the graph constructed by squaring the weights of edges in $G$. Let $T$ and $T’$ be the minimum spanning trees of $G$ and $G’$, respectively, with total weights $t$ and $t’$. Which of the following statements is TRUE? $T’...

discrete-mathematics graph-theory trees
Tuki
Tuki
11:01
hello
Shobhit
Shobhit
hi
Secret
Secret
[Random cont.]
Example of utterly wrong and totally incomprehensible stuff because I have no idea what I am doing and suffer from the Dunning–Kruger effect:
â‘ 
\begin{align}
V & := \{ \textbf{x,y,z},a,b \in \Bbb{F} :\\
\textbf{x}+\textbf{0} & = \textbf{x}\\
\textbf{x}1 & = \textbf{x}\\
a(b\textbf{x}) & = (ab)\textbf{x}\\
(\textbf{x}+ \textbf{y}) + \textbf{z} & = \textbf{x} + (\textbf{y} + \textbf{z})\\
\textbf{x}+ \textbf{y} & = \textbf{y} + \textbf{x}\\
\textbf{x}+ (-\textbf{x}) & = \textbf{0}\\
a(\textbf{x}+ \textbf{y}) & = a\textbf{x}+ a\textbf{y}\\
(a + b)\textbf{x} & = a\textbf{x}+ b\textbf{x}\}\\
\end{align}
â‘¡
\begin{align}
\textbf{x} : V \mapsto \Bbb{F}\\
user image
Tuki
Tuki
if i have $f(x,y)=x+y+4\sin(x)\sin(y)$ what can i say when $f(x,y)\ge 0$ ??
Secret
Secret
user image
Tuki: I don't see what can be said about the function if it is nonegative, bumps?
Tuki
Tuki
how large is your image ?
user image
plot from both $x,y$ in $]-2,2[$
Secret
Secret
11:16
ok, so mathpix does not even align its graph at the origin...
Tuki
Tuki
The exact question is: What can be said from following statements when dot (x,y) is close enough to origin ?
then the exact statement is $$ x+y+4\sin(x)\sin(y)\ge 0 $$
something like matlab is great. I can have very specific plots
Secret
Secret
(0,0) seemed to be a saddle point, thus your f can be +ve or -ve depending on how you approach it
Tuki
Tuki
yes
however if you compute gradient at point $(0,0)$ you get vector $$\begin{bmatrix} 1 \\ 1 \end{bmatrix}$$
but shouldn't gradient be zero in saddle point ?
now this is confusing
Tuki
Tuki
11:37
@Secret what you mean with ve ?
vector ?
Secret
Secret
negative and positive
Tuki
Tuki
vector right ?
or gradient ?
so direction $\begin{bmatrix} 1 \\ 1\end{bmatrix} $ is increasing
$\begin{bmatrix} -1 \\ -1 \end{bmatrix}$ is also increasing ?
$\begin{bmatrix} 1 \\ 0 \end{bmatrix}$ and $\begin{bmatrix} 0 \\ 1 \end{bmatrix}$ are decreasing directions ?
if we look from $(0,0)$ ?
now this does makes sense but how to prove this ?
Shobhit
Shobhit
hi
Can someone help me prove $E = F - int(F)$ is a nowhere dense closed set if $F$ is a closed set
closed part is easy
i am not able to show N.D
I know two definitions of N.D set
$Int(Cl(A)) = \phi$
and, for any open set $U$ there exists an open proper subset $V$ of $U$ such that $A \cap V = \phi$
Joás Fellipe
Joás Fellipe
11:57
I hope one day to be smart enough to make difference
Shobhit
Shobhit
me too
Unknown123
Unknown123
12:11
3 days unanswered, please help guys math.stackexchange.com/questions/2625222/…
Shobhit
Shobhit
I can start a bounty on your question to attract attention @Unknown123
Alessandro Codenotti
Alessandro Codenotti
You already know it's closed, so show it has empty interior
Shobhit
Shobhit
yes, i have tried to no avail. I am using the first definition, but cant show it.
Alessandro Codenotti
Alessandro Codenotti
Suppose $F-\text{int}(F)$ has an interior point for contradiction
What does that mean?
Leaky Nun
Leaky Nun
@AlessandroCodenotti contradiction :'(
Shobhit
Shobhit
12:22
then there exists a ball contained in that set around that point
@AlessandroCodenotti
Alessandro Codenotti
Alessandro Codenotti
Right, but if that ball is in $F-\text{int}(F)$ then it's also in $F$
Shobhit
Shobhit
yes
Alessandro Codenotti
Alessandro Codenotti
So that point is an interior point of $F$
Shobhit
Shobhit
yes
Alessandro Codenotti
Alessandro Codenotti
So you have an interior point of $F$ in $F-\text{int}(F)$
Shobhit
Shobhit
12:28
but B(x,r) is not in Int(F), so x is not in interior of F, contradiction?
noooo
sorry
so $Int(F -Int(F))$ is a subset of $Int(F)$
@AlessandroCodenotti
Alessandro Codenotti
Alessandro Codenotti
Yes, but that's not a problem, the contradiction is the one in my last message
Shobhit
Shobhit
oh, got it
an interior point of $F$ cannot be contained in $F - int(F)$
correct?
@AlessandroCodenotti
Alessandro Codenotti
Alessandro Codenotti
Yes, you just removed them
Shobhit
Shobhit
yeah, thank you :)
nathdwek
nathdwek
12:47
Hello stupid question
what is the covariance matrix of (x, y) where x and y are the coordinates of a point randomly chosen from a circle with uniform angular probability?
Tuki
Tuki
so does anyone know about this problem ?
How do you prove a point is saddle point ?
nathdwek
nathdwek
ok I am dumb
@Tuki Hessian matrix
Tuki
Tuki
even though the point isn't considered as critical point since $\nabla f(0,0)\neq 0$ does hessian matrix work in this case @nathdwek ?
well i can always try
nathdwek
nathdwek
My understanding is that a saddle point is always a critical point
Tuki
Tuki
i agree but isn't the definition that critical point exist when $\nabla f(x,y)=0$, when $\nabla f(x,y)$ is not defined (example: division with 0), when the point belongs to border of the domain ?
domain in this case would be $(x,y)\in \mathbb{R}$ ?
this wouldn't fall into any of these categories
Shobhit
Shobhit
13:02
I need to prove that every complete metric space is a baire space.
i am thinking of showing that if $A_{n}$ is a sequence of open dense sets then $A = \cap_{n \in N} A_{n}$ is dense in $X$.
Can someone help me in how to start this
I am thinking of starting with contradiction that there exists an open set $O$ in $X$ s.t $A \cap O = \phi$
but how can i use here that X is complete?
where to use the complete property?
Tuki
Tuki
what is baire space @Shobhit ?
Shobhit
Shobhit
have you studied topology? @Tuki
Tuki
Tuki
nope
Shobhit
Shobhit
then it will be hard to understand now, try googling it if you wish to know
Tuki
Tuki
I am familiar with what topology means in terms of 3d-modeling but this doesn't probably translate to mathematics
PVAL-inactive
PVAL-inactive
13:10
@tuki It probably does, but it might not translate to the undergraduate curriculum.
Tuki
Tuki
I agree
Shobhit
Shobhit
yes, your 3D model should be like you can stretch but cannot break, along those ines
*lines
@PVAL-inactive any ideas? how can i use complete property here?
PVAL-inactive
PVAL-inactive
You are going to have to use the metric in some way.
Shobhit
Shobhit
the metric is not given
PVAL-inactive
PVAL-inactive
I'm unsure how to give a hint without giving it away.
Shobhit
Shobhit
13:16
:(
ok, i'll continue thinking
user777
user777
13:27
Hi I have this simple question in graph theory: math.stackexchange.com/questions/2630532/…
I want to understand this statement:
Observe that a graph is a cluster graph if and only if it does not contain a path on three vertices (P3) as an induced subgraph
suppose I have several connected component, each are complete graph. Then, by fact above, it is not cluster graph; since it does have path with 3 vertices.
cluster graph is the collection of disjoint cliques.
Perturbative
Perturbative
Hey everyone
Yo @Daminark
Alessandro Codenotti
Alessandro Codenotti
@Sobhit to show that the intersection is dense you want to show that it hits every open set, in particular every open ball
So call $A=\bigcap A_i$ where $\{A_i\}$ is your countable family of dense open sets and let $U$ be an open ball, you want to show $U\cap A\neq\varnothing$ knowing $U\cap A_i\neq\varnothing$ for all $i$
But you actually know more about $U\cap A_i$ than just the fact that the intersection is nonempty
And I've given too many hints already :P
Trey
Trey
14:10
is there any trig identity which can be used for $\int tan^5 x sec^3 xdx$?
Xander Henderson
Xander Henderson
@Trey The typical approach for those kinds of problems is to use power reduction formulae
and to know the derivatives of $\tan$ and $\sec$
Perturbative
Perturbative
user image
Why is $\phi[M]$ an open submanifold of $\widehat{M}$?
$\phi[M]$ need not necessarily be an open subset of $\widehat{M}$
Semiclassical
Semiclassical
14:38
@Trey You might want to check via WolframAlpha whether that has a nice antiderivative in the first place
If it was $\sec^2 x$ I'd be sure that it does. But with $\sec^3 x$ I'm not nearly as confident
Trey
Trey
@Semiclassical Indeed it's not that pretty, I managed to solve it by rewriting it as $\int(-1 sec^2(x))^2 tan(x) sec^3 x$$ and setting $u = sec(x)$
Semiclassical
Semiclassical
hmm
0celo7
0celo7
@Perturbative inverse function theorem
Semiclassical
Semiclassical
it might be easier with the substitution $v=\cos x$
But that's just a variation on the same theme
0celo7
0celo7
@Perturbative an embedding of equidimensional manifolds is an open map
PVAL-inactive
PVAL-inactive
14:43
sec^3 has an antiderivative
its actually a problem in spivak
Semiclassical
Semiclassical
sure. it's just not as obvious to me what it is, whereas I've got $\frac{d}{dx}\tan x=\sec^2 x$ in my memory banks
PVAL-inactive
PVAL-inactive
He calls it "very important"
it reduces to sec
Semiclassical
Semiclassical
hmm
PVAL-inactive
PVAL-inactive
so you need to know how to integrate that
Semiclassical
Semiclassical
yeah, $\int \sec x\,dx$ isn't very obvious iirc
not absurdly hard, by any means
but not obvious
0celo7
0celo7
14:45
@PVAL-inactive is he being sarcastic?
PVAL-inactive
PVAL-inactive
I don't think so.
0celo7
0celo7
why would the antiderivative of secant be important?
Balarka Sen
Balarka Sen
iirc its log|sec x + tan x|
PVAL-inactive
PVAL-inactive
Lots of trignometric functions show up naturally in physics, geometry, pdes and odes.
I don't know where sec^3 shows up only that Spivak seemed to be hinting at something important.
Semiclassical
Semiclassical
$$\frac{d}{dx}\sec x=\frac{\sin x}{(\cos x)^2}=\tan x\sec x$$
that's cute, I guess
Balarka Sen
Balarka Sen
14:48
what? no cube
Semiclassical
Semiclassical
durrrrrr brain
Balarka Sen
Balarka Sen
its sec(x) tan(x)
philmcole
philmcole
Hey guys
Semiclassical
Semiclassical
yeah, not sure wtf I was thinking
Balarka Sen
Balarka Sen
thats why the thing i said works; log(sec(x) + tan(x)) differentiates to (sec(x)tan(x)
+ sec^2(x))/(sec(x) + tan(x))
which is sec(x), conveniently
Semiclassical
Semiclassical
14:50
right
i'm trying to think how $\int \sec^3 x\,dx$ would relate to $\int \sec x\,dx$ in terms of integration by parts
Balarka Sen
Balarka Sen
well it's sec(x) d(tan(x))
Semiclassical
Semiclassical
actually, though, I'm probably making things too complicated
Balarka Sen
Balarka Sen
So that is convenient
Semiclassical
Semiclassical
oh, nice
yeah
philmcole
philmcole
I'm trying to find the value of the series $\sum _{n=1}^\infty \frac {1}{(2n+1)^{2}}$ by using Fourier. I have this equation and need to find a suitable $x$ to get a value for the above series

$$x(1-x) = \frac{1}{6} - \sum_{n=1}^\infty \frac{\cos(2\pi n x)}{\pi^2 n^2}$$

Does anybody have an idea which $x$ to choose? (already tried $0,\frac{1}{2}$, but those yield different series...)
Balarka Sen
Balarka Sen
14:51
Hm, I have to integrate tan(x) d(sec(x)) later on
Which is sec(x) tan^2(x) dx
Semiclassical
Semiclassical
@philmcole well, my first instinct would be to choose $x$ so that $\cos(2\pi n x)=0$ when $n$ is even
So in particular $\cos(4\pi x)=0$
What values of $x\in [0,1]$ will work for that?
philmcole
philmcole
This could work!
$[0,1)$
Semiclassical
Semiclassical
right
same difference since the series is 1-periodic, though
Xander Henderson
Xander Henderson
Yeah, but $1=0$
because you are on the torus!
philmcole
philmcole
Hmm I need to choose an $x$ so that the inside is something like $\frac{\pi}{2},\frac{3\pi}{2},\frac{5\pi}{2}$... so that the cosine is zero
Semiclassical
Semiclassical
14:58
Right. So you want $4\pi x = \pi (m+1/2)$ for integer $m$
though writing it like that a bit overkill here.
So what $x$ is that?
philmcole
philmcole
$x = \frac{m + 1/2}{4}$
Semiclassical
Semiclassical
yeah. so 1/8,3/8,5/8,7/8
I'm a little unsure this is the right route, though
philmcole
philmcole
So $\frac{2m+1}{8}$
for $m$ an integer
let's choose $m=1$ then
then this is in the interval
or $m=0$ should work too I guess?
Semiclassical
Semiclassical
the problem I see is that, while cos will vanish on the even n, the odd terms won't all have the same sign
and you definitely don't want that
I think I see the 'right' approach, though
philmcole
philmcole
ok?
Semiclassical
Semiclassical
15:04
You noted that the series for x=0 and x=1/2 don't give you what you want
just for the sake of argument, can you write out those two cases here?
I'm fine with you just writing down the first few terms for each of them
philmcole
philmcole
Like this?
Case $x=0$:

$$0 = x(1-x) = \frac{1}{6} - \sum_{n=1}^\infty \frac{\cos(2\pi n x)}{\pi^2 n^2} = \frac{1}{6} - \frac{1}{\pi^2}\sum_{n=1}^\infty \frac{1}{n^2}$$

therefore $\sum_{n=1}^\infty \frac{1}{n^2} = \frac{\pi^2}{6}$.

Case $x=\frac{1}{2}$

$$\frac{1}{4} = x(1-x) = \frac{1}{6} - \sum_{n=1}^\infty \frac{\cos(2\pi n x)}{\pi^2 n^2} = \frac{1}{6} - \frac{1}{\pi^2}\sum_{n=1}^\infty \frac{\cos(\pi n)}{n^2} = \frac{1}{6} - \frac{1}{\pi^2}\sum_{n=1}^\infty \frac{(-1)^n}{n^2}$$

therefore $\sum_{n=1}^\infty \frac{(-1)^n}{n^2} = -\frac{\pi^2}{12}$.
Semiclassical
Semiclassical
Right. Or, to put it more concretely:
\begin{align}
1+\frac{1}{4}+\frac{1}{9}+\frac{1}{16}+\cdots &= \frac{\pi^2}{6},\\
-1+\frac{1}{4}-\frac{1}{9}+\frac{1}{16}-\cdots &= -\frac{\pi^2}{12},\\
\end{align}
Agreed?
philmcole
philmcole
yeah
Semiclassical
Semiclassical
What happens if you take the difference of those two series?
philmcole
philmcole
Ahhhh
Semiclassical
Semiclassical
15:08
yuuup
philmcole
philmcole
haha I thought way to complicated
Semiclassical
Semiclassical
Equivalently, you can look at this as $f(1/2)-f(0)$
philmcole
philmcole
yeah
Semiclassical
Semiclassical
That's probably the shortest way to write this out, since it makes it unnecessary to verify those two series separately
philmcole
philmcole
That's the easier solution of the three indeed
Thanks man
Semiclassical
Semiclassical
15:11
np
I should note that you see variations on this trick a lot
For example, suppose $F(z)=\sum_{n=0}^\infty a_n z^n$
philmcole
philmcole
Yes
Semiclassical
Semiclassical
Then $F(z)+F(-z)=\sum_{n=0}^\infty a_n [z^n+(-z)^n]=\sum_{n=0}^\infty a_n z^n(1+(-1)^n)=\sum_{k=0}^\infty 2a_{2k}z^{2k}$
Which is really not much more than saying $\frac{1}{2}(F(z)+F(-z))$ is the even part of $F(z)$
philmcole
philmcole
Got it
Semiclassical
Semiclassical
But it means that, if we know how to compute $F(z)$, then we can not only get $F(1)=\sum_{n=0}^\infty a_n$ but we can actually get the sum of just the even/odd terms
philmcole
philmcole
I get the feeling to be good at math you need to have really a lot of those tricks up your sleeve all the time
Semiclassical
Semiclassical
15:16
depends what you do, really
I've used this trick in actual research, but it was natural in context
a more advanced version of this is to do something like $F(z)+F(\omega z)+F(\omega^2 z)$ with $\omega = e^{2\pi i/3}$
philmcole
philmcole
yikes
Semiclassical
Semiclassical
It's not bad, actually: $1+\omega^n+\omega^{2n}=0$ if $n$ isn't a multiple of 3
and if it is, it just equals 3
So that sum will 'filter out' those coefficients which aren't multiples of 3
philmcole
philmcole
And with something like that you can get the sum of only the $n$-th terms?
Shobhit
Shobhit
@Semiclassicali have used this method many times in calculating sum of binomial coefficient
Semiclassical
Semiclassical
^
@philmcole right
philmcole
philmcole
15:19
Will get more complicated for $n \gt 3$ then I suppose
Semiclassical
Semiclassical
it do
philmcole
philmcole
nice trick
Semiclassical
Semiclassical
yeah. the name you'll see for it is the 'root of unity filter'
philmcole
philmcole
oh yeah the first result shows the binomial coefficient immediately
Semiclassical
Semiclassical
right
Shobhit
Shobhit
15:24
@AlessandroCodenotti i also know that every intersection $A_{n} \cap U$, i used that and formed a ball inside one another, had to use cantor intersection theorom (advice of a friend) to conclude. thank you.
Secret
Secret
15:45
user image
muhahahaha, functionally beaten
Daniel Cortild
Daniel Cortild
16:03
Hello
Shobhit
Shobhit
hi
Daniel Cortild
Daniel Cortild
Do you know something about probability?
Shobhit
Shobhit
nope
but ask away
someone might
Sha Vuklia
Sha Vuklia
guys, is this true:
$$
\int_{-\infty}^\infty\delta(x-\lambda)^2dx=\delta(0)
$$
Daniel Cortild
Daniel Cortild
So you throw an infinite number of coins, equal probabilty to land on each side
Sha Vuklia
Sha Vuklia
16:06
user image
Slereah
Slereah
@ShaVuklia probably not since that's not a well defined quantity
Sha Vuklia
Sha Vuklia
I'm trying to see why this is true
Daniel Cortild
Daniel Cortild
Call the sides $1$ and $2$...
Sha Vuklia
Sha Vuklia
@Slereah right, well can you explain the screen shot then to me?
Slereah
Slereah
What you might be interested in is the wavefront set
Sha Vuklia
Sha Vuklia
16:07
because what I suggested was my attempt at an explanation
Daniel Cortild
Daniel Cortild
Find the probability that you get a sequence of $5$ "0"'s before 3 "1"'s
Slereah
Slereah
Which allows you to multiply distributions if their singularities aren't in the "same place"
Sha Vuklia
Sha Vuklia
@Slereah that's directed at me?
Slereah
Slereah
So this quantity is well defined if $\lambda \neq \mu$
yes
Sha Vuklia
Sha Vuklia
the context here is just some algebraic manipulations in an introductory course in quantum
wait, I'll give you a bit more
Slereah
Slereah
16:08
If it's a QFT book then it's probably not meant to be rigorous
Sha Vuklia
Sha Vuklia
user image
Slereah
Slereah
The rigorous version is gonna be using the wavefront set, yes
Sha Vuklia
Sha Vuklia
quantum mechanics
I just want to have some intuition on why it's true
we are basically showing that the position eigenfunctions satisfy some sort of orthogonality condition
Slereah
Slereah
well if $\lambda \neq \mu$, the product of those two is gonna be $0$ outside of $\lambda$ and $\mu$
Sha Vuklia
Sha Vuklia
I am interested in the case $\lambda=\mu$
Slereah
Slereah
16:09
Well here's the secret : there's no position eigenfunction :p
They're not part of the Hilbert space
Sha Vuklia
Sha Vuklia
that's not the point griffith's is making
Slereah
Slereah
the case $\lambda = \mu$ isn't defined
Sha Vuklia
Sha Vuklia
right
Slereah
Slereah
if you want an intuitive version of this, try defining the delta function as the limit of a gaussian
that should give you the reason why this work if the singular supports aren't overlapping
Sha Vuklia
Sha Vuklia
with that last sentence you mean when $\mu\neq\lambda$?
Slereah
Slereah
16:14
yes
(the singular support is the domain on which the distribution can't be defined by a function, roughly)
$\text{sing supp}(\delta) = 0$
Semiclassical
Semiclassical
I'll note that this is a point in standard QM treatments that @0celo7 takes issue with
I think it's the same, anyways (that there's no such thing as position eigenfunctions in Hilbert space as such)
Balarka Sen
Balarka Sen
16:57
@Daminark eyo
do you want to hear a small rant on continued fractions
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