A Number Sequence with Everything - Numberphile
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- Опубликовано: 9 ноя 2022
- Neil Sloane discusses The Inventory Sequence... See also Jane Street's special page: www.janestreet.com/numberphil...
More links & stuff in full description below ↓↓↓
Neil Sloane is founder of the legendary OEIS: oeis.org/
Inventory Sequence at: oeis.org/A342585
Jane Street's page mentioned in this video at: www.janestreet.com/numberphil... (episode sponsor)
Numberphile is supported by the Simons Laufer Mathematical Sciences Institute (formerly MSRI): bit.ly/MSRINumberphile
We are also supported by Science Sandbox, a Simons Foundation initiative dedicated to engaging everyone with the process of science. www.simonsfoundation.org/outr...
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Video by Brady Haran and Pete McPartlan
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Check out Jane Street's sidewalk sequence at: www.janestreet.com/numberphile2022
Visit the OEIS at: oeis.org/
First reply
I use OEIS
4:53 The envelope reminds me of the Fibonacci numbers, which has a cosine in it.
OEIS is one of my favourite websites, It's always a joy to see videos on the myriads of wonderful sequences it contains! Thank you!
The Jane St thing sounds to me like "Hey, if you are smart and like math, come help us make rich people even richer". Am I wrong?
@@maitland1007 It sounds like a cult.
Honored to be mentioned in this video by the great Neil Sloane! Thank you Neil and thank you Numberphile for posting the video.
To be fair, you've earned it 😅
Awesome when a celebrity reacts to the video!
What is this sequence like in binary?
@@staizer It's not based on the digits but on the numbers. I.e. when 10 shows up you don't view it as a one and a zero, but as a ten.
Interesting question nonetheless, were you to interpret a 10 as a one and a zero.
Thanks for a creative and beautiful sequence, Joseph!
A beautiful message to end the video with. A lot of math isn't in the destination, but the understanding you develop on the journey.
So you gonna tell me, maybe the real math is the friends we made along the way?
Shouldn't we generalize that?
Journey before Destination.
A 2000 theorems journey starts with 1 statement
@@lonestarr1490 I was about to say something similar
"We have the variations, but we don't know what the theme is." What a stellar analogy for mathematical puzzles.
The music was like someone getting chased, and stumbling, but every time they stumble they manage to run a bit further and the suspense builds
@@aceman0000099 It's a neat effect how the tempo doesn't change, yet it feels like something is getting away from you.
Neil Sloane is an international treasure. With every video he appears in, the content becomes so interesting and engaging. More Neil!
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Strangley, even the fun maths is super important.
When people find new and weird ways of doing something silly and fun with stuff like this, it can bring forward new ideas which can be used to solve more important problems in mats
On a meta-level, it is not that surprising that a sequence defined recursively in terms of _all_ its previous values exhibits interesting behavior. No information is ever lost - every element of the sequence will be used infinitely often in computing subsequent elements. The sequence just meditates upon itself forever, without ever losing any "insight" once gained.
This man loves what he's doing. He looks so satisfied at the end of the video )
Love Neil and the OEIS. Used it for a math puzzle the other day :)
That's cheating
I often think about math instead of actually concentrating on whatever lesson is at hand and whenever i figure out a cool sequence or constant i plug it in the OEIS to see if there's any cool formulae or connections with other numbers
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I was literally just rewatching the planing sequence video when I got this notification.... This guy is so satisfying to listen to, and the sequences he shows us are so fun! Love it
Totally agree. Would love to see progress made into understanding these types of sequences.
Look up the 'Experimental Mathematics' RUclips channel, and you'll find some Zoom lectures from Neil regarding all kinds of OEIS sequences. Also, a lot of other cool videos! It's a small channel from Rutgers University, but Neil is a constant on it.
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Thanks for the recommendation! @@maynardtrendle820
I love this guy he has the most calming voice
Neil is so excitedly passionate and I just absolutely love it! He's adorable and so interesting to hear from 💕
I'd be really curious to see a Fourier Transform of this series, it reminds me a lot of energy levels and spectra from chemistry/physics.
I don't know if it's possible
Me too! Should be doable in a program. You can find the sequence on the OEIS
@@aceman0000099 You'd have to interpolate the original sequence to get a continuous function, I think. Fourier transformation of discreet values doesn't make sense - unless I'm mistaken.
@@bur2000 as far as I know, both Discrete Fourier Transform and Continuous Fourier Transform exist
Neil is awesome, his excitement is super contagious!
Two great quotes from this video.
"Here, we have the variations. But we don't know the theme."
"Maybe in itself its just a sequence. But who knows where it will lead."
I can't help but notice, there's also the little digits Neil draws to say which number each term refers to. I wonder how the sequence would change if you included those! It'd be kind of like the look-and-say sequence, but without grouping the numbers.
neil's videos are some of my absolute favourites. he has an amazing, relaxing voice.
Your enthusiasm and fascination with this Inventory Sequence are pleasantly infectious.
It is interesting.
It's one of my favorite posts in numberphile - thanks for that!
glad you liked it.
Neil Sloane is one of the best Numberphile presenters!
Neil is a math poet. I love his video's.
Kkkk😊
This is without a doubt my favorite numberphile video
Every video with this guy is a must-watch.
I could listen to him talk for hours. Always interesting and engaging -- I've watched every video you've made with him. I do hope you'll have more videos with him in the future.
Always love to see a Sloane video, the man makes my day
It's never a bad time to thank Neil Sloane for his contributions which have helped mathematicians around the world for generations.
This was all so very fascinating. I’m a pianist, too, and found the musical tie-in to be very intriguing.
Boulez would certainly have liked to make something from this. The closest piece for piano I know to that sequence is Ligeti, Devil Staircase.
I see you went down the YT alg rabbit hole too
I show up to every video with Neil Sloane and I always will!
Love a Neil Sloane video - thank you Numberphile :)
8:54 He mentions John Conway - it was just after the first minute that I thought of the look-and-say sequence that Conway had analyzed and apparently made famous.
My goodness I should have been a mathematician! I could sit around, drink coffee and come up with sequences like this all day! ;-)
If I were a greedy inventory taker, I wouldn't re-start my inventory when I get a zero. Instead, I would immediately jump to the number corresponding to the count I just arrived at. For example, if I'm currently counting the number of 8's, and I count 3 of them, I would count the number of 3's next. Of course I know that will be one more than the last time I counted it. So I never really have to re-count anything, I'm just incrementing by one every time.
Videos with Neil Sloane are always a highlight. One question I have is whether every number will appear? Isn't it possible that one number gets skipped by all previous numbers, so you'd always have to take inventory for the same number from that point?
No, I don't think so. The zeros take care of that. Every time you take inventory there is one more zero. So all the numbers appear in the first column.
rewatch around 2:30 he says the next line will always be the next number
Apart from the trivial appearance (when the numbers appear because of the zeros) - do we know if every numbers appears at least once more?
@@Boink97 that's a great question, we need answers!
@@Boink97 , due to the fact that numbers are constantly being added and never taken away, this doesn't seem as though it would ever skip any number infinitely, even if you don't count the number's required initial appearance. We can see that the amount of each number (the columns formed in the way he lays it out) will continue to increase. They may not increase on every row, but they all increase. So, once a number gets a 1 in its column (which it has to, given the "trivial appearance"), it will certainly increase from there.
Neil is always an amazing guest, his love for these sequences is very infectuous
I just love this gentleman, his passion about numbers and sequences are just intoxicated
The content is amazing but his speaking voice is absolutely wonderful ❤. So soothing and such a captivating style.
Those rows of book on the shelf facing him seem like such a lifetime of mathematical passion.
The OEIS is an amazing resource. One of the best websites in existence
Always love the Neil Sloane sequences videos :)
Always enjoy his videos. What truly amazes me though is there was a time when he consciously chose that wallpaper. 😂
I adore seeing Neil explain more sequences!
"it's very irregular, and wonderful" love the enthusiasm, new to this channel.
Oh boy, more Neil!
After I listen to this absolutely fascinating discussion, I have come to the conclusion that, for humanity, mathematicians are quite possibly one of the most important and vital community of completely batshit crazy people in the world.
Great background music for a suspense scene
I love vids with Neil Sloane!!!😍
Love the Sloane videos.
I love your videos!❤
I would love to look at the same sequence with a variation where you also count the "index".
So it would go:
0_0 (zero "zeroes")
2_0; (two "zeroes" because you got the "index") 0_1;
4_0; 1_1; 1_2; 0_3;
6_0; 4_1; 2_2; 1_3; 2_4; 0_5;
8_0; 6_1; 5_2; 2_3; 3_4; 2_5; 2_6; 0_7;
...
First entry is always 2n (you always have one index for 0 and the last entry) but the pattern for other digits looks very different, or maybe we can find some connection with the "base" sequence!
I thought at first that is how the pattern would work in the video, since he wrote those subscripts and asked how many we could see, but apparently, they were just there to help him explain/keep track of the meaning of each digit. The sequence in the video could be written without the subscripts entirely (and in one continuous line).
An interesting aspect of doing it in a way that includes the index is that you are guaranteed that the numbers in the columns will always increase by at least one for every additional row, because the index is will always be present in each row.
By the way, slight error in your index-counting sequence. The 4th line should have "2_4;" instead of "1_4;" (there is a 4 in line three and a 4 earlier in line four), which would change your 5th line to 8_0; 6_1; 5_2; 2_3; 3_4; 2_5; 2_6; 0_7;
So far, this suggests each row will stop (by hitting a 0) at 2n-1.
@@SgtSupaman Oh yeah, fixed now.
Awesome sequence and wonderful explanation!
After seeing the underlying mathematics of the look-and-say sequence, I most certainly hope we will be able to find and explain since structure with this one as well. What an absolute beauty
The worst Neil Sloane video I've ever watched was excellent. Can never have too much of this man.
Very interesting material, I wish to see some more youtube material around this topic!
I really enjoy the OEIS videos. I got a sequence accepted a few years ago (A328225) after one of these videos. This just reminded me that I never figured out why my sequence looked the way it did when it was plotted. I would love to hear some thoughts. I am not a mathematician in any form, so it could be absolutely nothing.
I'm gonna look, I'll get back to you in a bit
Oh wow, that's quite cool! Seems like such a strange rule, but the plot is very interesting!
@@dallangoldblatt7368 Thanks Dallan
@@connorohiggins8000 What does prime(n) mean? Checking to see if it's prime? Does it return 1 or 0? But then, what would prime(prime(n)) be? How does that sequence work? (This is just a formula question, I simply do not know what prime(n) might return.)
@@kindlin Hi, so prime(n) means the nth prime, prime(1) = 2, prime(2) = 3, prime(3) = 5 .... If n = 2 then prime(prime(n)) = prime(3) = 5. It is a bit of a weird sequence.
The sequence looking for a killer app.
Quite distinctly put, Mr Sloane!
thank you Neil!
Love a Neil sequence video
I made something for this in Excel, took about an hour to make but it works flawlessly
Love this sequence!
I really like his videos! More!
Please do a video on the infinite sidewalk!! That’s fascinating.
Thanks for sharing the link!
Even before the big obvious leap in the curve that you called attention to, I was already noticing a smaller leap in the earlier part of the curve, and now looking at the larger curve with the big obvious leaps in it there are even more clearly a series of ever-smaller leaps near the beginning of the sequence too.
The patterns are beautiful.
A Great game for elementary students, to build concepts of sequence, logic, infinity, graph, etc etc!! I will do this in my next math lecture
I love these pieces of math art. I was hoping this would go towards music. It's awesome.
I love this one so much
More Neil please.
So cool!
I wonder how it changes in different base numbers
Everybody needs someone who talks about them like Dr. Sloane talks about sequences.
God bless you, man.
I loved this video so much
Great!
Mesmerising sequence!
The plot looks like a banger 808 sample 👀 Need to check it asap!
Neil Sloane - what a lovely fellow. Great video.
Love this stuff
Yay more Neil! :D
I adore all of his video. He really makes math interesting, captivating and fun! I already dread for the day he shall pass.
Is this somehow connected to the Mandelbrot set? That's what struck me when I saw "this sequence has everything" and the fundamental unpredictable yet beautiful nature of it seems very similar to Mandelbrot. The fact that when converted to music, it seems to follow a pattern of highs to lows with slight variatons for each block/chunk is like penrose/fractal tiling that repeats infinitely with small variations, aperiodic yet beautiful!
his chuckle is Epic
i got very excited about this and was playing with it, started one where i did inventory but inventoried numbers greater than or equal to the index (later found it in OEIS already) but i found some fun patterns and would love to know why they’re like that! there was a fractal pattern that emerged and also there was another OEIS sequence correlated with the peaks. would love to hear someone like Neil explain why
Regardless of the inherent value of the sequences themselves, the best of these videos is seeing how happy they make him!
I for one would listen to an album length recording of the sequence on a grand piano.
I didn't know you could download those as MIDI! I immediately went off to go make some sequence music!
Very cool sequence!
Oh, this guy is great!
I know nothing about math, but i love this guy!
Always gonna celebrate each new Neil Sloane video, 🎉 and always gonna ask for more ❤
This guy is really the OG of calculation!!!!
The way Neil eases us into his sequences makes me certain he's got grandkids that he loves to read to.
It's impossible not to chuckle at ~5:00 when Sloane shows the sequence's unexpected behaviour.
Why?
I love his reply to Brady's comment at that point when he says it's irregular... and wonderful. The way he says that makes me smile.
@@andybaldman Because of both how unpredictable the sequence's envelope turns out to be and how endearingly Neil Sloane presents it.
Just when you thought things were making sense.
Love this interview. One small note (ha): I wish his musical example had been Bach’s Goldberg Variations, which are themselves loaded with very purposeful mathematical design elements. Still, I appreciate a musical reference very much!
Its very helpful
More!!... I want more!!.. also, what are the chances the secrets to primes and Reimann and the universe end up being unraveled by figuring out some sequence already hiding in the OEIS right now?.. that would be so cool
I would love a video/song with the inventory sequence that goes on for quite a while, like it sounds here
Saw a video of a musician analyzing the song of the skylark bird. The skylark's song was slowed down 10x and it was suggested had some similarities to Bach!
The more we see of Neil's office, the cooler it gets!
This video is interesting!
More please!
Stockhausen and Xenakis would be very proud of Sloane’s “Variations con Théme Perdu”
So do you keep track of numbers bigger than 1 digit? So if there are 10 8s, does that get counted as 1 10 or 1 1 + 1 0?
This is a key comment, absoulutely right he isn't counting digits so far he is counting number of that size number, so if he was working in base 2, he would count 0, 1 , 10, 11, 100, 101 etc and get the same graph.