I can generate all coprime pairs by following the ternary-tree algorithm listed on wikipedia: https://en.wikipedia.org/wiki/Coprime_integers
Quickly:
Start with two coprime branches: (2,1), (3,1), then iterate:
Branch 1: (2m-n,m)
Branch 2: (2m+n,m)
Branch 3: (m+2n,n)
However the space used will grow by a factor of three for each pair produced (and say printed, or otherwise not kept in memory).
Here might be a solution in haskell: Generating sorted list of all possible coprimes
But I was looking for something in python, which does not have lazy evaluation or infinite lists.
The first element in each pair must be less than the second. The sorting must be done in ascending order -- by the sum of pair's elements; and if two sums are equal, then by the pair's first element.
If so, you want to swap those pairs in your algorithm. And Python does have infinite generators, which are probably like your "infinite lists." And are you trying to avoid the "grow by a factor of three" issue or do you just want simple Python code?itertools
) that yield potentially infinite sequences, though.