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Mees de Vries
Mees de Vries
15:00
@JessyCat, glad I could help.
Well, then I suppose I agree with VSauce or other channels. :-)
Shin Kim
Shin Kim
A biologist, a physicist and a mathematician were all drinking coffee and tea and observing a house across the street from them.
They notice that two people walk into the house and then an hour later, three people walk out.
Physicist: An experimental error. Our first measurement was incorrect.
Biologist: No, they've obviously reproduced.
Mathematician: No, now when a one person enters the house, it'll be empty again.
from MO
Jessy Cat
Jessy Cat
And one more thing, every isomorphism is also an embedding, right?
@MeesdeVries wait a sec. If $\sigma$ and $\rho$ are even and odd, respectively, then $\sigma \rho$ is odd, so $\phi(\sigma\rho) = \sigma\rho\tau$, which I need to equal $\sigma \tau \rho$ in order to show that $\phi$ is a homomorphism, but $\rho$ and $\tau$ don't commute, do they?
Ooh, wait a minute, I saw what you did there, @MeesdeVries. Nevermind.
@MeesdeVries sorry to keep bugging you, but what about when they're both odd?
Mees de Vries
Mees de Vries
What about it?
Jessy Cat
Jessy Cat
How to show it's a homomorphism in that case.
Mees de Vries
Mees de Vries
Well. Which two things have to be equal for that to be true?
Jessy Cat
Jessy Cat
15:11
I have that $\sigma \rho$ is even, so $\phi(\sigma \rho) = \sigma \rho$.
But, since $\sigma, \, \rho$ both odd, we have that $\phi(\sigma) = \sigma \tau$, $\phi (\rho) = \rho \tau$
Wait a minute...the $\tau$'s are inverses of each other.
Silly Jessy. Trix are for kids.
Mees de Vries
Mees de Vries
Exactly. Always write down what you have to prove, and what you know. It so often turns out to be easier than you thought.
Jessy Cat
Jessy Cat
I have a tendency to be extremely impulsive in speaking and asking questions - tends to make people think I'm either stupid or know nothing...and always to their detriment later.. bwahahaha
Aksel'sRose
Aksel'sRose
hello all, trying to prove that norm of v =norm of w iff v+w is orthogonal to v-w.
DHMO
DHMO
It fascinates me that the natural numbers can be expressed as sets...
sasha
sasha
any help will be appreciated
0
Q: Inductive proof for Bauer's theorem

sashaPre requisite Hardy and Wright first prove the following theorem $$\prod_{t(p)} (x-t)=x^{p-1}-1 \pmod{p}\; ...(1),$$ where $p$ is a prime number. $t(p)$ represents the set of numbers less than $p$ and co-prime to $p$. $t$ represents a number from the set $t(p)$. Bauers Theorem The authors la...

number-theory elementary-number-theory prime-numbers modular-arithmetic congruences
thanks :)
Aksel'sRose
Aksel'sRose
15:16
ive worked the norms to <v,v>-<w,w>=0 and im trying to get to <v+w, v-w>=0
Balarka Sen
Balarka Sen
@Aksel'sRose Back calculate. Start from <v+w, v-w> = 0.
Then you'd get a pretty good idea how to get the other direction.
Aksel'sRose
Aksel'sRose
@BalarkaSen okay, i will try that. thanks
Balarka Sen
Balarka Sen
@DHMO Every natural number is trivially a set: {n}.
DHMO
DHMO
@BalarkaSen no, I mean the number itself.
Jessy Cat
Jessy Cat
@MeesdeVries and for injectivity, since the identity permutaiton is even, we will get that only when $\sigma = id$, right?
Balarka Sen
Balarka Sen
15:18
By which, I mean there is a correspondence between N and the singletons of N.
Jessy Cat
Jessy Cat
No way to get there for an odd $\sigma$?
Balarka Sen
Balarka Sen
@DHMO A natural number is an element of a set. That is not itself a set, per se.
What do you have in mind?
DHMO
DHMO
@BalarkaSen the set definition of natural numbers
Mees de Vries
Mees de Vries
In ZF(C), everything is a set.
In particular, $n = \{0,\ldots,n-1\}$.
(At least, typically, you could take different definitions.)
DHMO
DHMO
and $0 = \varnothing$
Balarka Sen
Balarka Sen
15:20
@DHMO My definition of natural number is the plain one, from Peano axioms :P
But sure, there are many many definitions.
DHMO
DHMO
@BalarkaSen the definitions are equivalent
Balarka Sen
Balarka Sen
Of course they are
DHMO
DHMO
you can also incorporate sets with Peano axioms
by defining the successor function in terms of sets
Balarka Sen
Balarka Sen
I am aware
DHMO
DHMO
I find the set-theory definition quite neat.
Balarka Sen
Balarka Sen
15:21
I was just objecting to saying "a natural number is a set". You can define them as a set.
But you can also define them in ten thousand different - but equivalent - ways.
DHMO
DHMO
you do have a point
Balarka Sen
Balarka Sen
There's e.g., a definition of $\Bbb N$ in Church's lambda calculus.
DHMO
DHMO
I am aware
exercise: prove that $\omega^2 = \omega + \omega^2$.
Hanno
Hanno
hi all
Balarka Sen
Balarka Sen
Hi
DHMO
DHMO
15:32
@Hanno Che hanno?
Hanno
Hanno
hm?
DHMO
DHMO
italian for "what do they have"
in your language it would be "Was haben sie"
Hanno
Hanno
ah right, could have known that :)
DHMO
DHMO
"hanno" means "they have"
Hanno
Hanno
yep I remember
DHMO
DHMO
15:34
nice
Tobias Kildetoft
Tobias Kildetoft
@DHMO Sorry, was away for a while there. $\omega$ is the smallest ordinal strictly larger than any finite ordinal.
DHMO
DHMO
@TobiasKildetoft yes, but it is not how it is defined...
Tobias Kildetoft
Tobias Kildetoft
@DHMO how is it defined then?
DHMO
DHMO
@TobiasKildetoft you know, $4 = \{0,1,2,3\}$
then $\omega = \cup \Bbb N$
Hanno
Hanno
whats the problem?
DHMO
DHMO
15:43
17 mins ago, by DHMO
exercise: prove that $\omega^2 = \omega + \omega^2$.
here is the exercise
Tobias Kildetoft
Tobias Kildetoft
@DHMO Well, that definition is clearly the same given that inequalities between ordinals is given by containment
DHMO
DHMO
@TobiasKildetoft you win
Hanno
Hanno
DHMO: do you already know about distributivity of ordinal multiplication?
Tobias Kildetoft
Tobias Kildetoft
@Hanno Hi. Long time no see
Hanno
Hanno
@TobiasKildetoft yes indeed, hope you are doing well? are you still in upsala?
Tobias Kildetoft
Tobias Kildetoft
15:48
@Hanno My employment there ended last week, so now I am unemployed for a while (I will go back to Aarhus as a postdoc August next year).
though I will probably meet with Walter occationally anyway
Hanno
Hanno
ah ok... good that you already have a new position in sight
Tobias Kildetoft
Tobias Kildetoft
Yeah, it is a shame that there is a break between, but better to have it already than not
I could also have had it start earlier, but this way is better for the timing on when my daughter will have to switch from pre-school to school (so we can move when she has to switch anyway)
Hanno
Hanno
yes that makes sense
DHMO
DHMO
@Hanno yes...
well of course you can use any way to prove it
it's just a simple exercise
Tobias Kildetoft
Tobias Kildetoft
@Hanno Still doing research?
Hanno
Hanno
15:53
@TobiasKildetoft not really, i think about math from time to time and enjoy it, but no research at the moment
Tobias Kildetoft
Tobias Kildetoft
ok
Hanno
Hanno
though i at times thinking about trying to return
computer science is fun but - at least in what i have been doing last year - lacking the depth and beauty of math
but its also less frustrating ;)
Martin Thoma
Martin Thoma
Do functions of the form f(x) = a / (x^s + c) + b have a name (such as "polynomial functions" or "exponential functions")? (with a, b, c, s > 0)
s.harp
s.harp
Does somebody know basic commutative algebra?
I'm trying to see why $\mathrm{ht}(I/(xA))+1≥\mathrm{ht}(I)$ if $x\in I$ with $I$ an ideal in $A$.
($A$ noetherian)
Hanno
Hanno
16:11
@s.harp you can reduce to the case where A is local and I is the maximal ideal
then its the statement that passing to the 'zero set' of an element does not drop dimension by more than one
s.harp
s.harp
16:34
@Hanno if $I$ is prime I can pass to the localisation of $A$ at $A-I$, which is lokal and $I$ is the maximal ideal, is that what you meant? (And is it true?)
Hanno
Hanno
yes and if I is not prime you instead consider the (minimal) primes containing it
Fargle
Fargle
Good morning chat.
s.harp
s.harp
Thanks, I think that I can see how to do it :)
Hanno
Hanno
@s.harp alright :)
s.harp
s.harp
@Hanno if I set an element of $A$ zero by passing to the quotient (say in lokal case), does $\mathrm{Spec}(A)$ do something simple/understandable?
The points that contain $x$ remain points still, and also the closed sets that only contain such points remain closed, but I don't see whats going to happen to the prime ideals that dont contain $x$
Hey-men-whatsup
Hey-men-whatsup
17:03
guys may i ask something
I need interpretation help
s.harp
s.harp
ask
saturatedexpo
saturatedexpo
is every subspace a dimension smaller then its supspace?
s.harp
s.harp
if your vector space is finite dimensional, then yes
for a counterexampe with an infinte dimensional vectorspace consider the functions of finite support from $\mathbb N\to\mathbb C$ and the subspace where $f(0)=0$, both spaces have same dimension (there is an isomorphism between them) but one is a strict subspace of the other
Hey-men-whatsup
Hey-men-whatsup
about limit (area under the curve), where does the writer get the equation (in the red box)? I've read it about 2 hours haven't got any clear understanding
user image
Astyx
Astyx
Hi
saturatedexpo
saturatedexpo
17:08
bon sois @Astyx
s.harp
s.harp
@hey-men check here for example math.stackexchange.com/questions/122546/…
Hey-men-whatsup
Hey-men-whatsup
@s.harp thank you let me read it
s.harp
s.harp
the standard way to do it would be over $(k+1)^3-k^3= 3k^2+3k+1$, you can see that
$$\sum_{k=0}^n (k+1)^3-k^3 = (n+1)^3$$
and the sums of the right terms are $3\sum_k^n k^2+3\sum_k^n k + n$, where only the first term is unknown
Hey-men-whatsup
Hey-men-whatsup
thank you
Astyx
Astyx
Can you define a norm on a Vector space on a field that is neither $\Bbb R$ nor $\Bbb C$ ?
And can you define a vector space on a ring ?
s.harp
s.harp
17:14
@Astyx that depends on what you mean with norm, ultrametric fields ($\mathbb Q_p$) have an absolute value and with that you can define norms on their vector spaces
saturatedexpo
saturatedexpo
@Astyx isnt $\mathbb{Z}_p$ satisfieing everything?
Tobias Kildetoft
Tobias Kildetoft
@Astyx "Vector spaces" on general rings are called modules
@saturatedexpo satisfying all what?
Astyx
Astyx
@TobiasKildetoft Oh yes of course thank you
saturatedexpo
saturatedexpo
@TobiasKildetoft satisifieing being a space.
Tobias Kildetoft
Tobias Kildetoft
@saturatedexpo you mean a vector space? Sure
but not one with a norm
saturatedexpo
saturatedexpo
17:17
ah ok
Astyx
Astyx
@s.harp I see thank you !
teadawg1337
teadawg1337
17:31
I found this identity while flipping through my notebook, is there a simple way to prove it? $$\sum_{n=1}^\infty\sum_{k=1}^n\frac{(-1)^{n+k}}{nk}=\frac{\pi^2}{12}+\frac12\ln‌​^2 2$$
saturatedexpo
saturatedexpo
if $\frac{a}{b}<\frac{c}{d}$, show that $\frac{a}{b}<\frac{a+c}{b+d}<\frac{c}{d}$. All variables are positive. is this strongly connected to: $a<\frac{a+b}{2}<b$?
Astyx
Astyx
How do you make mathjax text appear correctly ?
Here on the chat
saturatedexpo
saturatedexpo
tinyurl.com/cfqcvpc @Astyx
Astyx
Astyx
Thanks !
Fargle
Fargle
Howdy @Balarka
Balarka Sen
Balarka Sen
17:36
hi
Astyx
Astyx
Hi
Fargle
Fargle
How goes it?
Balarka Sen
Balarka Sen
@s.harp Prime ideals in A/I are in 1-1 correspondence with prime ideals of A containing I.
@Fargle 'salright
arctic tern
arctic tern
@saturatedexpo intuitively, it means if you combine the numbers behind two averages, you get a new average in between the original two. here's one way to prove it. first prove with c=d. then prove with c<d using a/b<(a+c)/(b+c)<(a+c)/(b+d). then do c>d with a/b<(a+d)/(b+d)<(a+c)/(b+d). assuming everything's positive.
@teadawg1337 take the mercator series for ln(2), square it, look at symmetry along diagonal n=k
teadawg1337
teadawg1337
@arctictern Ah, that works
Balarka Sen
Balarka Sen
17:41
@Fargle What's up with you?
Fargle
Fargle
About to leave to get a job, actually. Waiting tables. Not glamorous but it'll be money in the pocket.
Balarka Sen
Balarka Sen
I wish you luck on your job!
Fargle
Fargle
That said I'll be leaving for a bit but I'll leave the chat open so you can make my computer go "doonk" constantly.
Thank you!
Balarka Sen
Balarka Sen
I'll have to leave too though. Gotta get to work.
Astyx
Astyx
Bye !
teadawg1337
teadawg1337
17:45
@arctictern I just found my work a couple of pages afterward, and that's actually exactly what I did to derive it in the first place
saturatedexpo
saturatedexpo
18:04
i like the idea of partitions. The humans i like and the humans i not like are two disjunct sets that form all humanity. brilliant.
Astyx
Astyx
What about the humans you do not care about ?
saturatedexpo
saturatedexpo
@Astyx well, humans i don't care about i don't like, or i like them. depending on the context.
but they'd fall into exactly one of those sets
teadawg1337
teadawg1337
@Astyx The humans not cared about are a subset of the humans that are disliked
Astyx
Astyx
How can you like something you do not know ?
How can you dislike something you do not know ? :)
saturatedexpo
saturatedexpo
if someone didn't disappoint me i like them.
or: if someone has made me happy i like them.
i mean $\neg$ like. not dislike ;)
(or hate)
Astyx
Astyx
18:09
I think we should formalize the idea of "liking"
saturatedexpo
saturatedexpo
haha
maybe just say 3 disjunct sets
easier and fits all discussions ;)
like, not known, dislike
arctic tern
arctic tern
disjoint
saturatedexpo
saturatedexpo
oh, typical german
meh, i think i write all my math now in english
Astyx
Astyx
The symbols don't vary that much from german to english do they ? :)
saturatedexpo
saturatedexpo
i think to 99% not
But translating for MSE and a german board is silly
(or MSE and my homework)
but it helped me so far to understand what is meant
because you can't translate if you don't know what it means. example: positive in french
Astyx
Astyx
18:18
Mm ?
saturatedexpo
saturatedexpo
positive in french is $a\geq 0$, whereas normally $a>0$
Astyx
Astyx
Oh yes
I'm always outraged by people claiming 0 is not positive :)
saturatedexpo
saturatedexpo
that's why writing mostly with symbols and equations is so much better because it's international.
Astyx
Astyx
I don't agree
Writing with words makes the proof so much clearer and easy to read
saturatedexpo
saturatedexpo
yes, but only if the text is properly paragraphed IMO
Astyx
Astyx
18:21
Of course
saturatedexpo
saturatedexpo
otherwise it's stupid, just my pov
basicly i always paragraph for a "then" or "therefore"
Astyx
Astyx
What's more with words you can tell the reader exactly what you are trying to prove which makes the proof require far less concentration that without it, and this is not something you can do with symbols
saturatedexpo
saturatedexpo
yes words can be a great additional guide
but having a precise symbolic definition helps precision?
Tobias Kildetoft
Tobias Kildetoft
In my experience, people just learning math use way too few symbols at first, then graduately start using way too many and finally scale down to an appropriate balance
Astyx
Astyx
In mine too :)
saturatedexpo
saturatedexpo
18:28
To the symbols: i read that "while" is a byproduct of laziness. Do you agree?
Tobias Kildetoft
Tobias Kildetoft
@saturatedexpo Not sure what you mean
saturatedexpo
saturatedexpo
$a\cdot b>0$ while $a,b\in \mathbb{N}_1$ for example
i dont think i nailed it tho, wait i look the thread up ;)
arctic tern
arctic tern
so "[condition holds] while [hypothesis is true]"?
sounds efficient to me
saturatedexpo
saturatedexpo
oh, i confused it with "where"
3
Q: Math Symbol for "Where"

Kevin PeiPretty much any math text I've read introduces notation through a similar format of equation-notation or notation-equation form e.g ax+b+c where a = ..., b = ..., etc. or Let a = ..., b = ..., etc. ax+b+c I tend to see the former more and was wondering if there has been an offici...

notation
Astyx
Astyx
As long as one understands your writing ...
saturatedexpo
saturatedexpo
18:34
not even me understands what i write. that doesn't say someone else doesn't, just that sometimes i don't haha
Tobias Kildetoft
Tobias Kildetoft
@saturatedexpo I think "where" is fine for some purposes.
"while" seems rare, at least in my own papers so far (except in ordinary English sentences)
saturatedexpo
saturatedexpo
@TobiasKildetoft do you think tho, that i should, if possible, avoid "where"? as a beginner
Tobias Kildetoft
Tobias Kildetoft
@saturatedexpo Not necessarily
saturatedexpo
saturatedexpo
i mean to me it's analogous to programming.
Tobias Kildetoft
Tobias Kildetoft
Sometimes it is more natural to have the main object first, then mention what everything was afterwards. Sometimes, this makes for a more natural read than introducing everything beforehand
saturatedexpo
saturatedexpo
18:36
where you first have to define all variables and THEN make a statement
like a=b+c, while b and c are reals. this would not compile nicely
Tobias Kildetoft
Tobias Kildetoft
it also does not make much sense mathematically
saturatedexpo
saturatedexpo
$\{\forall a\in A:a=b+c\}$ where $b,c\in \mathbb{R}$
Astyx
Astyx
That is kind of the point : no one wants to read a algorithm, we're humans not computers ... It requires a huge amount of attention to read and understand a large enough algorithm
Tobias Kildetoft
Tobias Kildetoft
now we are getting into the "where" being ambiguous
saturatedexpo
saturatedexpo
But wouldn't it be more proper: Let $b,c\in\mathbb{R}$ ....?
Tobias Kildetoft
Tobias Kildetoft
18:43
basically, "where" mainly belongs in definitions
saturatedexpo
saturatedexpo
ah ok
just learning how to speak "userfriendly" math ;)
Tobias Kildetoft
Tobias Kildetoft
Best way to learn is to read stuff written by people write well
And these are easy to recognize, since they are the ones that are the easiest to understand
Astyx
Astyx
I couldn't agree more
saturatedexpo
saturatedexpo
that way I did not thought of!
altho it kinda is obvious^^
Akiva Weinberger
Akiva Weinberger
XKCD has endorsed Clinton
Astyx
Astyx
18:48
Mmm ?
saturatedexpo
saturatedexpo
@TobiasKildetoft if you think that further, there lies alot of truth in "a great [artist] copies"?
just exchange artist with what you want
Tobias Kildetoft
Tobias Kildetoft
Certainly
teadawg1337
teadawg1337
math.stackexchange.com/questions/2003926/…
I think this is a half-decent question. It's a shame it's posed so poorly
john smith
john smith
Hi , I want a permutation that first increases, reaches a maximal , then decreases, for example [1,3,4,6,5,2] but not [1,3,2,4,6,5] . Can anyone explain in how many ways I can do it ?
Tobias Kildetoft
Tobias Kildetoft
19:04
@johnsmith So that corresponds to choosing a subset of the numbers being permuted
well, of the numbers being permuted except the largest one
john smith
john smith
@TobiasKildetoft I want to calculate " Given N, count how many permutations of [1, 2, 3, ..., N] satisfy the above property "
saturatedexpo
saturatedexpo
@teadawg1337 you mean with posed "presented"?
teadawg1337
teadawg1337
@saturatedexpo Yes
Tobias Kildetoft
Tobias Kildetoft
@johnsmith Right, so that means there are $2^{N-1}$ such.
john smith
john smith
@TobiasKildetoft Can you explain how?
Tobias Kildetoft
Tobias Kildetoft
19:07
@johnsmith choose the elements in the increasing part
saturatedexpo
saturatedexpo
@teadawg1337 is the question: "is there a function that intersects with a halfcircle at more then 2 points"?
john smith
john smith
@TobiasKildetoft Sorry but I am not getting the point
Tobias Kildetoft
Tobias Kildetoft
@johnsmith the increasing part is uniquely determined by which elements are in it. And once this is determined, the decreasing part will consist of the remaining elements.
teadawg1337
teadawg1337
@saturatedexpo Yes, specifically of the form $x^n+y^n=1$. And with that specific haf-circle
john smith
john smith
@TobiasKildetoft How does this lead to 2^(n-1)
Tobias Kildetoft
Tobias Kildetoft
19:12
@johnsmith because that is the number of subsets of a set with $n-1$ elements
saturatedexpo
saturatedexpo
@teadawg1337 won't fit a sinus curve with slight adjustments? (leftright slided and updown slided)
teadawg1337
teadawg1337
I don't know, I haven't tried manipulating the constraints of the problem. As it stands, brute force calculation shows that $n<\frac{200}{113}$ within the original problem description
Astyx
Astyx
@johnsmith funnily enough someone had exactly the same question yesterday ...
john smith
john smith
@Astyx He might also be solving the same problem
Astyx
Astyx
@johnsmith See chat.stackexchange.com/transcript/36/2016/11/6/16-21
Sarvin was his name
john smith
john smith
19:21
@Astyx Yes I am also solving the same problem
Astyx
Astyx
And did you understand the solution ?
s.harp
s.harp
@teadawg1337 shouldn't the interior of $x^n+y^n=1$ in the first quadrant always be convex? maybe from stuff like that it can be seen to be impossible?
teadawg1337
teadawg1337
it holds computationally
It appears to be possible
s.harp
s.harp
what do you mean it holds? As in ther exist $n\in\mathbb Q$ so that $x^n+y^n=1$ intersects the circle line more than twice?
john smith
john smith
@Astyx I don't know why But I am not able to understand the solution
Astyx
Astyx
19:23
You want a permutation that first increases then decreases
teadawg1337
teadawg1337
@s.harp Yes, at least according to WolframAlpha (and, by extension, Mathematica)
I'm just as confused by it myself
john smith
john smith
@Astyx Yes
s.harp
s.harp
funky
teadawg1337
teadawg1337
$n$ may very well be irrational
Astyx
Astyx
@johnsmith Such a permutation is uniquely defined by the elements that are in the increasing part
For instance [1,3,4,6,7,5,2] is uniquely defined by $\{1,3,4,6\}$ in the sense that if you are told the numbers in the increasing sequence are 1,3,4 and 6, the only permutation allowed is [1,3,4,6,7,5,2]
Does this help ?
teadawg1337
teadawg1337
19:28
@s.harp The curves still maintain convexity, their slope just varies such that it intersects a unit circle. By the intermediate value theorem, there have to be at least two values of $n$ such that $x^n+y^n=1$ intersects a unit circle centered at $(1,1)$ exactly three times. The OP gave the value of $65/116$, which intersects said circle four times.
s.harp
s.harp
The map $(0,1)\times\mathbb R_{>0}\to\mathbb R^2$, $(t,h)\mapsto (t^{1/h},(1-t)^{1/h}) =(\exp(ln(t)/h),\exp(ln(1-t)/h) )$is continuous, and $(1/2,h)\mapsto (1/2^{1/h},1/2^{1/h})$
john smith
john smith
@Astyx I think I understand : I compute all the subsets except the largest number in it
s.harp
s.harp
This point always lies on the diagonal and for $h\to\infty$ it goes to $(1,1)$, for $h\to0$ it goes to $(0,0)$
so it has to intsersect the circle line
Astyx
Astyx
@johnsmith Exactly
john smith
john smith
@Astyx That was easy , don't know why I could not think of this
s.harp
s.harp
19:31
the intersection of the circle with the diagonal line is at the point $(1-\sqrt{2},1-\sqrt{2})$, so if you find an $h$ so that $1/2^{1/h}=1-\sqrt{2}$ you have an $h$ with $3$ intersection points
john smith
john smith
@Astyx @TobiasKildetoft Thanks for your help and patience
s.harp
s.harp
$h=-\ln(2)/\ln(1-\sqrt{2})$ would be a solution, lets see if im an idiot or it actually works
teadawg1337
teadawg1337
Wait, but $\ln(1-\sqrt{2})$ is complex
s.harp
s.harp
oooooh i need $1/\sqrt{2}$ not $\sqrt{2}$, that was a mistake
teadawg1337
teadawg1337
That does work
Balarka Sen
Balarka Sen
19:37
@teadawg1337 Even $x^3 + y^3 =1$ intersects a lot of circles centered at $0$ exactly 4 times.
teadawg1337
teadawg1337
The OP is asking for $x^{1/n}+y^{1/n}=1$, so the exponents are less than one
s.harp
s.harp
user image
those are two curves, they do look like they intersect
teadawg1337
teadawg1337
Mhm
s.harp
s.harp
@Balarka its not a circle centered at $0$, but one centered at $(1,1)$ and its supposed to intresect the $x^h+y^h=1$ line
Balarka Sen
Balarka Sen
I didn't read the original question.
teadawg1337
teadawg1337
19:41
@BalarkaSen math.stackexchange.com/questions/2003926/…
It's phrased somewhat poorly
s.harp
s.harp
$h\approx 0.564476$ is the expression from above
teadawg1337
teadawg1337
But $h=1/2$ intersects only twice, and $h=.53$ intersects four times according to WolframAlpha
So there's another $h$ value
I'm too tired to do the actual working out, though.
s.harp
s.harp
the intersection cannot be on the diagonal then though
teadawg1337
teadawg1337
I don't think that's a constraint within the original problem, though
Your $h$ value does indeed work, though
s.harp
s.harp
yeah, I was just remarking that the ansatz from above can only find the intersections on the diagonal, so gotta try something new
Balarka Sen
Balarka Sen
19:51
nice question
you can probably set up bounds for $h$ where you might get more than than 2 intersections, because for $h \to 1$ it becomes like a line and $h \to 0$ it becomes a closer and closer approximation for $xy = 0$.
I don't know how to deal with such questions for curves cut out by nonpolynomial equations. The best tool to count intersections for polynomial cases is Bezout's theorem.
alright, gotta go
Semiclassical
Semiclassical
hi chat
teadawg1337
teadawg1337
Hey @Semiclassical
Astyx
Astyx
Hi
What example of the use of topology to solve problems not directly linked to topology would you give to someone to show how useful it is ?
Semiclassical
Semiclassical
20:07
point set or algebraic?
Astyx
Astyx
Both
Tobias Kildetoft
Tobias Kildetoft
@Astyx In arxiv.org/abs/1601.06975 we ended up using topological considerations a couple of places, even though the topic is very far from topology
Astyx
Astyx
Thanks I'll give it a read ! However I was looking for more "direct" applications
Tobias Kildetoft
Tobias Kildetoft
What do you mean by "direct"?
Astyx
Astyx
That does not require a large mathematical background to understand
Something a beginner would understand easily enough
Alessandro
Alessandro
20:15
@Astyx If you're aiming at a general audience you might be interested in this video youtube.com/watch?v=AmgkSdhK4K8
Tobias Kildetoft
Tobias Kildetoft
That seems tough, since just the amount of topology needed will generally be more than a complete beginner knows
Astyx
Astyx
Thanks a lot
saturatedexpo
saturatedexpo
is topology all about bending figures with some special ruleset?
Tobias Kildetoft
Tobias Kildetoft
@saturatedexpo No
Astyx
Astyx
Thankfully
Alessandro
Alessandro
20:24
No, those are the pretty pictures that are shown in pop science books and videos
saturatedexpo
saturatedexpo
good, that i know now!
so would a topologian question be: "what is the average distant between 2 points in a square?"
or is this too banal?
s.harp
s.harp
distance is usually understood as an analytic notion and not as a topological one
Semiclassical
Semiclassical
if you have to invoke distance, you're probably not doing topology
that's too strong a statement, I'm sure, but 'the average distance between two points in a square' is certainly not topological
saturatedexpo
saturatedexpo
but: "when does the average distance of points in a wierd loop equal the average distance of points on a circle?"
Semiclassical
Semiclassical
I'd still chalk that up to analysis not topology
saturatedexpo
saturatedexpo
20:38
ok!^^
s.harp
s.harp
the best resource to learn about topology is the movie "El topo"
Semiclassical
Semiclassical
Topology tends to be less "what computations can you do" and more "what mappings can you make", I guess?
saturatedexpo
saturatedexpo
so topology is not (all) about loops
Semiclassical
Semiclassical
@s.harp what
oh. topo-logy
Tobias Kildetoft
Tobias Kildetoft
@Semiclassical To be honest, I have very little idea what sort of questions topologists are interested in these days
s.harp
s.harp
20:39
( youtube.com/watch?time_continue=35&v=3joYVNyyi5w )
Semiclassical
Semiclassical
Nor I
s.harp
s.harp
isn't this chatroom normally full of algebraic topologists?
Tobias Kildetoft
Tobias Kildetoft
@s.harp Yeah, and I have no idea what they talk about most of the time :)
Semiclassical
Semiclassical
heh
I'm not sure where Gauge Theory would fall in all of that
Alessandro
Alessandro
Jodorowski? Western sure doesn't look like his style! I think I'll check that out
Semiclassical
Semiclassical
20:42
I tend to see a lot of differential geometry in chat
Alessandro
Alessandro
that's @Balarka's fault
Semiclassical
Semiclassical
El Topo is quite bizarre from what I've heard of it
s.harp
s.harp
ill watch it tonight
saturatedexpo
saturatedexpo
how would you make a loop that doesn't contain a square formed by 4 distinct points ón the loop? that video is a cool teaser
s.harp
s.harp
I saw "A field in england" yesterday, I loved it :=)
Astyx
Astyx
20:45
What is it about ?
Alessandro
Alessandro
we don't know whether it's possible to make one @saturatedexpo
saturatedexpo
saturatedexpo
is this on the Gödel list? or "we wait for the next Fermat"-thingy?
Alessandro
Alessandro
actually the unsolved cases are pretty pathological curves, for all the well behaved loops it is known that you can find a square with its vertices on the loop
s.harp
s.harp
@saturatedexpo connect the ends of hte limit of this curve: en.wikipedia.org/wiki/Hilbert_curve
Semiclassical
Semiclassical
the more pathological the case, the less interesting I find it.
s.harp
s.harp
20:48
indeed, the morgue is the worst place to do mathematics
Astyx
Astyx
Haha
saturatedexpo
saturatedexpo
but for any morgue there winks some cool prize?
(if it's more then 100 years old, i guess)
Semiclassical
Semiclassical
Is there a name for this conjecture?
Ah, the inscribed square problem (wikipedia has a page)
Alessandro
Alessandro
yes it's that one
s.harp
s.harp
oooh I misunderstood it, I thought it was asking whether or not you had a curve that does not contain a square on the interior :)
anyway im going to go home now, have fun people
Astyx
Astyx
20:51
Bye
saturatedexpo
saturatedexpo
do science papers get submitted that don't solve a particular problem but introtduce to it?
Tobias Kildetoft
Tobias Kildetoft
@saturatedexpo Certainly plenty of papers introduce the very problem they also solve
Semiclassical
Semiclassical
Usually they at least offer some sort of progress, though
otherwise it's hard to explain why anyone should care about it
saturatedexpo
saturatedexpo
@Semiclassical so that is not unheard of, maybe i read some of those.
i mean it's more fun that way. To know that you are not the only dumb person haha
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