@fossilesque@mander.xyzM to Science Memes@mander.xyzEnglish • 7 months agoRabbit Populationmander.xyzimagemessage-square21fedilinkarrow-up1456
arrow-up1456imageRabbit Populationmander.xyz@fossilesque@mander.xyzM to Science Memes@mander.xyzEnglish • 7 months agomessage-square21fedilink
minus-squareBinettelinkfedilinkEnglish25•edit-27 months agoAnd the best part in this is that it all aligns with the Mandelbrot set, for some reason Edit: Nevermind, it’s the bifurcation diagram of the Mandelbrot set that does this.
minus-square@shneancy@lemmy.worldlinkfedilinkEnglish8•7 months agofunny how you can come to the same conclusions if you’re - a) doing science b) doing Buddhism c) doing drugs
minus-square@bsolos@lemm.eelinkfedilinkEnglish10•edit-27 months agoIt doesn’t, the one that aligns is the bifurcation diagram of the function used to make the set (f(z)=z^2+c), which is different from the rabbit one (the logistic map, f(x)=rx(1-x)).
minus-squareCollatz_problem [comrade/them]linkfedilinkEnglish4•7 months agoThey easily map to each other via linear transformation.
minus-squareMatch!!linkfedilinkEnglish3•7 months agothat’s meaningless because every bifurcation map looks the same
And the best part in this is that it all aligns with the Mandelbrot set, for some reason
Edit: Nevermind, it’s the bifurcation diagram of the Mandelbrot set that does this.
Life is just fractals tbh
funny how you can come to the same conclusions if you’re - a) doing science b) doing Buddhism c) doing drugs
It doesn’t, the one that aligns is the bifurcation diagram of the function used to make the set (f(z)=z^2+c), which is different from the rabbit one (the logistic map, f(x)=rx(1-x)).
They easily map to each other via linear transformation.
Oh I never knew that!
that’s meaningless because every bifurcation map looks the same