A binary tree of all Pythagorean triples

167 pointsposted a day ago
by hakmem
(richardt.io)

17 Comments

sevensor

21 hours ago

This is wonderful! I’d somehow missed the classical enumeration of Pythagorean triples. I learned them as magic numbers. That structure alone is worth the price of admission.

keithalewis

4 hours ago

There are Pythagorean triples (a, b, c) for which there do not exist integers m, n with a = m^2 - n^2, b = 2mn, c = m^2 + n^2.

dpunjabi24

11 hours ago

Beautiful. Thanks for sharing.

matt3210

20 hours ago

Very nice! nit: website isn’t mobile friendly

lollobomb

16 hours ago

Wow, this is extremely cool! Only problem, the JS slows my Firefox almost to freezing, is it normal?

hakmem

15 hours ago

Yes, this is normal. I am sorry, I am working on a more efficient implementation.

The JavaScript of this page does a lot of number crunching.

It is actually doing arithmetic on the Stern-Brocot tree. It is all written in ClojureScript and not really optimized yet. I mention in the paper that I do not even use TCO.

Anyway, thank you - and all the people here - for the kind words! I am so happy that my article was so well received today.

akomtu

15 hours ago

A simple trick to solve nearly all freezing problems: move the computations to a background thread, aka Worker in JS terms.

not2b

20 hours ago

You changed the article's title to an incorrect one. The tree of primitive Pythagorean triples is ternary, not binary. Each node has three children.

feoren

20 hours ago

Keep reading. The Barning-Hall tree is ternary, but this article is mostly devoted to the Stern-Brocot tree, which is binary.

generationP

20 hours ago

Both conventions are valid. You call it binary when you view it as a rooted tree, or ternary if you view it just as a graph.

nyrikki

20 hours ago

But it _all_ triples?

> I sketch how the stereographic projection of the Stern–Brocot tree forms an ordered binary tree of Pythagorean triples, which can be used to compute best approximations of turn angles of points on the circle and finally trigonometric functions

The permutation and stack problem in the page seem to indicate this is a potential method for approximations, but insufficient for _all_

That said I am reading this on mobile and may have missed something.

not2b

19 hours ago

The ternary tree contains all primitive triples (where the GCD of the terms is 1), where a<b<c. So it contains (3,4,5) but not (6,8,10) or (4,3,5).

nyrikki

19 hours ago

Yes, but the binary projection does not according to the link.

345 and 435 would require two binary trees.

AnotherGoodName

18 hours ago

I think skipping transposed values is fine though. You could just mirror the output at 45degrees for that if you wanted it. It does hit all distinct triples including the multiples of triples so it’s more inclusive of everything than the ternary tree.

hakmem

15 hours ago

You can see both triples are contained in one binary tree using the big diagram in section 3. The triple [3 4 5] has the "path" RR. The triple [4 3 5] the path R.

ColinWright

20 hours ago

From the article:

"I sketch how the stereographic projection of the Stern–Brocot tree forms an ordered binary tree of Pythagorean triples ..."

... and ...

"Before that, I briefly recapitulate the classical enumeration of Pythagorean triples and the ternary Barning–Hall tree."

So this article is about the binary tree representation.