this post was submitted on 07 Nov 2024
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Science Memes

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[–] Smokeydope@lemmy.world 30 points 2 weeks ago (2 children)

You eat this mandelbrot set right now mister or theres no desert for you!

[–] rockSlayer@lemmy.world 13 points 2 weeks ago

But infinite recursion hurts my tummy

[–] lugal@lemmy.ml 9 points 2 weeks ago

But I'm allergic to almonds and gluten intolerant!

[–] IHawkMike@lemmy.world 16 points 2 weeks ago

I drink my whiskey straight from the Klein bottle.

[–] rockerface@lemm.ee 15 points 2 weeks ago

Fair point, you can't take a stance that's too one-sided

[–] daniyeg@lemmy.ml 11 points 2 weeks ago (1 children)

obligatory mention of cliff stoll and his website.

[–] clay_pidgin@sh.itjust.works 8 points 2 weeks ago

Also obligatory link to the Numberphile video about Cliff's Klein bottles and his crawl-space robot warehouse. https://www.youtube.com/watch?v=-k3mVnRlQLU

Also obligatory link to his really fascinating and engaging book about being one of the first people to catch a hacker: https://en.wikipedia.org/wiki/The_Cuckoo%27s_Egg_(book)

[–] finitebanjo@lemmy.world 10 points 2 weeks ago (1 children)

Wasn't there a paper finding there are four possible klein flask orientations or something?

[–] drolex@sopuli.xyz 12 points 2 weeks ago* (last edited 2 weeks ago)

Yeah but it was written on a Möbius strip and we're still not sure where the beginning and where the end was.

ETA: the paper https://people.eecs.berkeley.edu/~sequin/PAPERS/2013_JMA_Klein-bottles.pdf

[–] PotatoesFall@discuss.tchncs.de 6 points 2 weeks ago (3 children)

I've seen this meme a couple times in my life, and never understood what "non-orientable" means. The word seems to imply the shape can't be oriented, i.e. rotated in space, which a klein bottle certainly could be right?

Can somebody explain?

[–] mexicancartel@lemmy.dbzer0.com 18 points 2 weeks ago (1 children)

"Non-orientable surface" is the thing. The surface of that thing is not orientable. That means you can't draw some normal vector to define the surface. When you traverse through the surface with a normal vector you can end up in the same point with that vector pointing the opposite direction in such a surface. That gives two directions for the same point or in other words you can't define the surface like that with a normal vector. Its the surface and not the shape itself that is non-orientable

[–] PotatoesFall@discuss.tchncs.de 3 points 2 weeks ago

thanks this is the only answer I understoo!

Thanks to everybody else tho appreciate it

[–] drolex@sopuli.xyz 10 points 2 weeks ago

If you follow the surface with your finger, starting from the outside, you can end up on the inside, without traversing the surface. There is only one surface, no concept of outside or inside, contrary to a good old cube for instance.

Similar to a Moebius strip but with a higher dimension. A MS is easier to understand since you can easily make one to try to run your finger on the surface and end up anywhere.

[–] mbt2402@hexbear.net 1 points 2 weeks ago* (last edited 2 weeks ago)

firstly understand the context which is smooth manifolds, for simplicity imagine a 2d manifold embedded in 3d space - so a sheet of rubber that can pass through itself but can't kink or do any funny business, just like in that sphere inversion video.

the definition of a manifold is basically that it can be built out of patches (sheets of rubber in our analogy), for instance to make a sphere, we need two sheets of rubber (ignore the actual logistics of the deformation required).

Now say that our sheets of rubber come with a textured and a smooth side, there are two ways to attach the sheets of rubber to make a sphere, one of which produces a sphere which is entirely smooth on the outside. This is what we mean by orientable, we can build it out of patches with a consistent "outside".

Consider the counterexample of a mobius strip, which we construct from a single strip of rubber by attaching one end to the other "backwards" (rough-smooth). Since we have defined it this way, it cannot be orientable. The klein bottle is another example, but somewhat cooler than the mobius strip since its a surface without edges.

There are many other definitions of orientable depending on the context, since manifolds are a lot more general than I have shown you here.

I don't know what orientable manifolds have to do with being responsible.

[–] lugal@lemmy.ml 4 points 2 weeks ago

No Klein bottle? Not even a small one?

[–] sharkfucker420@lemmy.ml 2 points 2 weeks ago
[–] Flocklesscrow@lemm.ee 2 points 2 weeks ago

Marc Blucas?