An Ornamental Geometric Inequality
I came across this "ornamental geometric inequality" in a tribute to Lothar Collatz.
Contents
An Inequality
I mentioned the German mathematician Lothar Collatz in my post in January on his 3n+1 Conjecture. Here is a beautiful inequality from his 1934 paper titled "Ornamental Geometric Inequalities". Consider the subregion of $-4 \le (x,y) \le 4$ for which
$$ ||||x| - 1| - 1| - |||y| - 1| - 1|| \ge \frac{1}{3} $$
I've never seen four absolute value signs in a row before.
Let's visualize it with MATLAB.
[x,y] = meshgrid(-4:1/256:4);
z = abs(abs(abs(abs(x)-1)-1) - abs(abs(abs(y)-1)-1)) >= 1/3;
imagesc([-4,4],[-4,4],z);
axis image
colormap(copper)
References
Lothar Collatz, 1910-1990, <http://www.math.uni-hamburg.de/home/collatz/auflage3-beta2.pdf>
Lothar Collatz, Gleichungen geometrischer Ornamente, (Kurvengleichungen mit Absolutstrichen). Z. mathem. u. naturw. Unterr. 64 (1934), 165-169.
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